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A comparison of latent semantic analysis and correspondence analysis of document-term matrices

Published online by Cambridge University Press:  18 May 2023

Qianqian Qi*
Affiliation:
Department of Methodology and Statistics, Faculty of Social Sciences, Utrecht University, Utrecht, the Netherlands
David J. Hessen
Affiliation:
Department of Methodology and Statistics, Faculty of Social Sciences, Utrecht University, Utrecht, the Netherlands
Tejaswini Deoskar
Affiliation:
Department of Languages, Literature, and Communication, Faculty of Humanities, Utrecht University, Utrecht, the Netherlands
Peter G. M. van der Heijden
Affiliation:
Department of Methodology and Statistics, Faculty of Social Sciences, Utrecht University, Utrecht, the Netherlands Southampton Statistical Sciences Research Institute, University of Southampton, Highfield, Southampton, UK
*
Corresponding author: Qianqian Qi; Email: [email protected]
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Abstract

Latent semantic analysis (LSA) and correspondence analysis (CA) are two techniques that use a singular value decomposition for dimensionality reduction. LSA has been extensively used to obtain low-dimensional representations that capture relationships among documents and terms. In this article, we present a theoretical analysis and comparison of the two techniques in the context of document-term matrices. We show that CA has some attractive properties as compared to LSA, for instance that effects of margins, that is, sums of row elements and column elements, arising from differing document lengths and term frequencies are effectively eliminated so that the CA solution is optimally suited to focus on relationships among documents and terms. A unifying framework is proposed that includes both CA and LSA as special cases. We empirically compare CA to various LSA-based methods on text categorization in English and authorship attribution on historical Dutch texts and find that CA performs significantly better. We also apply CA to a long-standing question regarding the authorship of the Dutch national anthem Wilhelmus and provide further support that it can be attributed to the author Datheen, among several contenders.

Type
Article
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution and reproduction, provided the original article is properly cited.
Copyright
© The Author(s), 2023. Published by Cambridge University Press

1. Introduction

Latent semantic analysis (LSA) is a well-known method used in computational linguistics that uses singular value decomposition (SVD) for dimensionality reduction in order to extract contextual and usage-based representations of words from textual corpora (Landauer and Dumais, Reference Landauer and Dumais1997; Jiao and Zhang, Reference Jiao and Zhang2021). We focus here on LSA of document-term matrices; the rows of the document-term matrix correspond to the documents and the columns to the terms, and the elements are frequencies, that is, the number of occurrences of each term in each document. Documents may have different lengths and margins of documents refer to the marginal frequencies of documents, namely the sum of each row of the document-term matrix; also, terms may be more or less often used and margins of terms refer to the marginal frequencies of terms, namely the sum of each column of the document-term matrix.

Among many other tasks (Di Gangi, Bosco, and Pilato, Reference Di Gangi, Bosco and Pilato2019; Tseng et al., Reference Tseng, Chen, Chang and Sung2019; Phillips et al., Reference Phillips, Saleh, Glazewski, Hmelosilver, Lee, Mott and Lester2021; Hassani, Iranmanesh, and Mansouri, Reference Hassani, Iranmanesh and Mansouri2021; Ren and Coutanche, Reference Ren and Coutanche2021; Gupta and Patel, Reference Gupta and Patel2021; Kalmukov, Reference Kalmukov2022), LSA has been used extensively for information retrieval (Zhang, Yoshida, and Tang, Reference Zhang, Yoshida and Tang2011; Patil, Reference Patil2022), by using associations between documents and terms (Dumais et al., Reference Dumais, Furnas, Landauer, Deerwester and Harshman1988; Deerwester et al., Reference Deerwester, Dumais, Furnas, Landauer and Harshman1990; Dumais, Reference Dumais1991). The exact factorization achieved via SVD has been shown to achieve solutions comparable in some ways to those obtained by modern neural network-based techniques (Levy and Goldberg, Reference Levy and Goldberg2014; Levy, Goldberg, and Dagan, Reference Levy, Goldberg and Dagan2015), commonly used to obtain dense word representations from textual corpora (Jurafsky and Martin, Reference Jurafsky and Martin2021).

Correspondence analysis (CA) is a popular method for the analysis of contingency tables (Greenacre, Reference Greenacre1984, Hou and Huang, Reference Hou and Huang2020; Van Dam et al., Reference Van Dam, Dekker, Morales-Castilla, Rodríguez, Wichmann and Baudena2021; Van Dam et al., Reference Van Dam, Dekker, Morales-Castilla, Rodríguez, Wichmann and Baudena2021). It provides a graphical display of dependence between rows and columns of a two-way contingency table (Greenacre and Hastie, Reference Greenacre and Hastie1987). Like LSA, CA is a dimensionality reduction method. The methods have much in common as both use SVD. In both cases, after dimensionality reduction, many text mining tasks, such as text clustering, may be performed in the reduced dimensional space rather than in the higher-dimensional space provided by the raw document-term matrix.

While a few empirical comparisons of LSA and CA, with mixed results, can be found in the literature, a comprehensive theoretical comparison is lacking. For example, Morin (Reference Morin1999) compared the two methods in the automatic exploration of themes in texts. Séguéla and Saporta (Reference Séguéla and Saporta2011) compared the performance of CA and LSA with several weighting functions in a document clustering task and found that CA gave better results. On the other hand, Séguéla and Saporta (Reference Séguéla and Saporta2013) compared the performance of CA and LSA with TF-IDF on a recommender system but found that CA performs less well.

The present article presents a theoretical comparison of the two techniques and places them in a unifying framework. We show that CA has some favorable properties over LSA, such as a clear interpretation of the distances between documents and between terms of the original matrix, and a clear relation to statistical independence of documents and terms. Also, CA can eliminate the margins of documents and terms simultaneously. Second, we empirically evaluate and compare the two techniques, by applying them to text categorization and authorship attribution in two languages. For text categorization, we use the BBCNews, BBCSport, and 20 Newsgroups datasets in English. In authorship attribution, we evaluate the two techniques on a large set of historical Dutch texts written by six well-known Dutch authors of the sixteenth century. Here, we additionally use CA to determine the unknown authorship of Wilhelmus, the national anthem of the Netherlands, whose authorship is controversial: CA attributes Wilhelmus to the author Datheen, out of the six contemporary contenders. To the best of our knowledge, this is the first application of CA to the Wilhelmus. In both cases, we find that CA performs better.

The rest of the article is organized as follows. Sections 2 and 3 elaborate on the techniques LSA and CA in turn. A unifying framework is proposed in Section 4. In Section 5, we compare LSA and CA in text categorization using the BBCNews, BBCSport, and 20 Newsgroups datasets. Section 6 evaluates the performance of LSA and CA for authorship attribution of documents where the author is known, and of the Wilhelmus, whose author is unknown. The article ends with a conclusion.

2. Latent semantic analysis

LSA has been extensively used for improving information retrieval by using the associations between documents and terms (Dumais et al., Reference Dumais, Furnas, Landauer, Deerwester and Harshman1988; Deerwester et al., Reference Deerwester, Dumais, Furnas, Landauer and Harshman1990), among many other tasks. Since individual terms provide incomplete and unreliable evidence about the meaning of a document, in part due to synonymy and polysemy, individual terms are replaced with derived underlying (latent) semantic factors. Although LSA is a very well-known technique, we first present a detailed analysis of the mathematics involved in LSA here as this is usually not found in the literature, and in a later section, it will help in making the comparison between LSA and CA explicit. We start with LSA of the raw document-term matrix and then discuss LSA of weighted matrices. The weighted matrices we study here include (i) a matrix with row-normalized elements with L1, that is, for each row the elements are divided by the row sum (the L1 norm), so that the sum of the elements of each row is 1; (ii) a matrix with row-normalized elements with L2, that is, for each row the elements are divided by the square root of sum of squares of these elements (the L2 norm), so that the sum of squares of the elements of each row is 1; and (iii) and a matrix that is transformed by TF-IDF.

The discussion is illustrated using a toy dataset, with the aim to present a clear view of the properties of the dataset captured by LSA and CA; see Table 1. The toy dataset has six rows, the documents, and six columns, the terms, with the frequency of occurrence of terms in each document in the cells (Aggarwal, Reference Aggarwal2018). Based on term frequencies in each document, the first three documents can be considered to primarily refer to cats, the last two primarily to cars, and the fourth document to both. The fourth term, jaguar, is polysemous because it can refer to either a cat or a car. We will see below how the LSA approaches, and later CA, represent these properties in the data.

Table 1. A document-term matrix ${\boldsymbol{F}}$ : size 6 $\times$ 6

2.1 LSA of raw document-term matrix

LSA is an application of the mathematical tool SVD, and can take many forms, depending on the matrix analyzed. We start our discussion of LSA with the SVD of a raw document-term matrix ${\boldsymbol{F}}$ , having size $m \times n$ , with elements $f_{ij}$ , $i=1,\ldots,m$ and $j=1,\ldots,n$ (Berry, Dumais, and O’Brien, Reference Berry, Dumais and O’Brien1995; Deisenroth, Faisal, and Ong, Reference Deisenroth, Faisal and Ong2020). Without loss of generality we assume that $n \geq m$ and ${\boldsymbol{F}}$ has full rank.

SVD can be used to decompose ${\boldsymbol{F}}$ into a product of three matrices: ${\boldsymbol{U}}^f$ , $\boldsymbol{\Sigma }^f$ , and ${\boldsymbol{V}}^f$ , namely

(1) \begin{equation} {\boldsymbol{F}} = {\boldsymbol{U}}^f\boldsymbol{\Sigma }^f({\boldsymbol{V}}^f)^T \end{equation}

Here, ${\boldsymbol{U}}^f$ is a $m \times m$ matrix with orthonormal columns called left singular vectors so that $({\boldsymbol{U}}^f)^T{\boldsymbol{U}}^f={\boldsymbol{I}}$ , $ {\boldsymbol{V}}^f$ is a $n \times m$ matrix with orthonormal columns called right singular vectors so that $({\boldsymbol{V}}^f)^T{\boldsymbol{V}}^f = {\boldsymbol{I}}$ , and $\boldsymbol{\Sigma }^f$ is a $m \times m$ diagonal matrix with singular values on the diagonal in descending order.

We denote the first $k$ columns of ${\boldsymbol{U}}^f$ as the $m\times k$ matrix ${\boldsymbol{U}}^f_k$ , the first $k$ columns of ${\boldsymbol{V}}^f$ as the $n\times k$ matrix ${\boldsymbol{V}}^f_k$ , and the $k$ largest singular values on the diagonal of $\boldsymbol{\Sigma }^f$ as the $k \times k$ matrix $\boldsymbol{\Sigma }^f_k$ ( $k\leq m$ ). Then ${\boldsymbol{U}}^f_k\boldsymbol{\Sigma }^f_k({\boldsymbol{V}}^f_k)^T$ provides the optimal rank- $k$ approximation of ${\boldsymbol{F}}$ in a least-squares sense. That is, ${\boldsymbol{X}} = {\boldsymbol{U}}^f_k\boldsymbol{\Sigma }^f_k({\boldsymbol{V}}^f_k)^T$ minimizes Equation (2) among all matrices ${\boldsymbol{X}}$ of rank $k$ :

(2) \begin{equation} ||{\boldsymbol{F}}-{\boldsymbol{X}}||^2_F =\sum _i\sum _j(f_{ij}-x_{ij})^2 \end{equation}

The idea is that the matrix ${\boldsymbol{U}}^f_k\boldsymbol{\Sigma }^f_k({\boldsymbol{V}}^f_k)^T$ captures the major associational structure in the matrix and throws out noise (Dumais et al., Reference Dumais, Furnas, Landauer, Deerwester and Harshman1988; Dumais, Reference Dumais1991). The total sum of squared singular values is equal to ${tr}((\boldsymbol{\Sigma }^f)^{2})$ , where ${tr}$ is the sum of elements on the main diagonal of a square matrix. The proportion of the total sum of squared singular values explained by the rank $k$ approximation is ${tr}((\boldsymbol{\Sigma }^f_k)^2)/{tr}((\boldsymbol{\Sigma }^f)^2)$ .

SVD can also be interpreted geometrically. As ${\boldsymbol{F}}$ is of size $m \times n$ , each row of ${\boldsymbol{F}}$ can be represented as a point in an $n$ -dimensional space with the row elements as coordinates, and each column can be represented as a point in an $m$ -dimensional space with the column elements as coordinates. In a rank- $k$ approximation, where $k\lt (m,n)$ , each of the original $m$ documents and $n$ terms is approximated by only $k$ coordinates. Thus, SVD projects the sum of squared Euclidean distances from these row (column) points to the origin in the $n$ ( $m$ )-dimensional space as much as possible to a lower, a $k$ -dimensional space. The Euclidean distances between the rows of ${\boldsymbol{F}}$ are approximated by the Euclidean distances between the rows of ${\boldsymbol{U}}^f_k\boldsymbol{\Sigma }^f_k$ from below, and the Euclidean distances between the rows of ${\boldsymbol{F}}^T$ are approximated by the Euclidean distances between the rows of ${\boldsymbol{V}}^f_k\boldsymbol{\Sigma }^f_k$ from below.

The choice of $k$ is crucial in many applications (Albright, Reference Albright2004). A lower rank approximation cannot always express prominent relationships in text, whereas the higher rank approximation may add useless noise. How to choose $k$ is an open issue (Deerwester et al., Reference Deerwester, Dumais, Furnas, Landauer and Harshman1990). In practice, the value of $k$ is selected such that a certain criterion is satisfied, for example, the proportion of explained total sum of squared singular values is at least a prespecified proportion. Also, the use of a scree plot, showing the decline in subsequent squared singular values, can be considered.

As ${\boldsymbol{F}}$ is a non-negative matrix, the first column vectors in ${\boldsymbol{U}}$ and ${\boldsymbol{V}}$ have the special property that the elements of the vectors depart in the same direction from the origin (Perron, Reference Perron1907; Frobenius, Reference Frobenius1912; Hu et al., Reference Hu, Cai, Franceschetti, Penumatsa, Graesser, Louwerse and McNamara2003). We give an intuitive geometric explanation for the $m$ rows of ${\boldsymbol{F}}$ . Each row is a vector in the non-negative $n$ -dimensional subspace of $R^n$ . As a result, the first singular vector, being in the middle of the $m$ vectors, is also in the non-negative $n$ -dimensional subspace of $R^n$ . As each vector is the non-negative subspace, the angle between each vector with the first singular vector is between 0° and 90°, and therefore the projection of each of the $m$ vectors on the first singular vector, corresponding to the elements of ${\boldsymbol{U}}_1$ , is non-negative (or each is non-positive, as we will discuss now). The same holds for the columns of ${\boldsymbol{F}}$ and the first singular vector ${\boldsymbol{V}}_1$ . The reason that the elements of ${\boldsymbol{U}}_1$ and ${\boldsymbol{V}}_1$ are all either non-negative or non-positive is that ${\boldsymbol{U}}^f_1\boldsymbol{\Sigma }^f_1({\boldsymbol{V}}^f_1)^T = -{\boldsymbol{U}}^f_1\boldsymbol{\Sigma }^f_1(-{\boldsymbol{V}}^f_1)^T$ , as the singular values are defined to be non-negative. As the lengths of the row vectors in $n$ -dimensional space to the origin are influenced by the sizes of the documents (i.e., the marginal frequencies), larger documents have larger projections on the first singular vector, and the first dimension mainly displays differences in the sizes of the margins.

As it turns out, the raw document-term matrix ${\boldsymbol{F}}$ in Table 1 does not have full rank; its rank is 5. The SVD of ${\boldsymbol{F}}$ in Table 1 is

(3)

For the raw matrix, LSA-RAW in Table 2 shows the singular values, the squares of the singular values, and the proportions of explained total sum of squared singular values (denoted as PSSSV). Together, the first two dimensions account for 0.855 + 0.128 = 0.983 of the total sum of squared singular values. Therefore, the documents and the terms can be approximated adequately in a two-dimensional representation using ${\boldsymbol{U}}^f_2\boldsymbol{\Sigma }^f_2$ and ${\boldsymbol{V}}^f_2\boldsymbol{\Sigma }^f_2$ as coordinates. As the Euclidean distances between the documents and between the terms in the two-dimensional representation, that is, between the rows of ${\boldsymbol{U}}^f_2\boldsymbol{\Sigma }^f_2$ and the rows of ${\boldsymbol{V}}^f_2\boldsymbol{\Sigma }^f_2$ , approximate the Euclidean distances between rows and between columns of the original matrix ${\boldsymbol{F}}$ , such a two-dimensional representation simplifies the interpretation of the matrix considerably.

Table 2. The singular values, the squares of singular values, and the proportion of explained total sum of squared singular values (PSSSV) for each dimension of LSA of ${\boldsymbol{F}}$ , of ${\boldsymbol{F}}^{L1}$ , of ${\boldsymbol{F}}^{L2}$ , and of ${\boldsymbol{F}}^{\text{TF-IDF}}$

Figure 1. A two-dimensional plot of documents and terms (a) for raw matrix ${\boldsymbol{F}}$ ; (b) for row-normalized data ${\boldsymbol{F}}^{L1}$ ; (c) for row-normalized data ${\boldsymbol{F}}^{L2}$ ; and (d) for matrix ${\boldsymbol{F}}^{\text{TF-IDF}}$ .

On the other hand, it is somewhat more difficult to examine the relation between a document and a term. The reason is that, by choosing a Euclidean distance representation both for the documents and for terms, the singular values are used twice in the coordinates ${\boldsymbol{U}}^f_2\boldsymbol{\Sigma }^f_2$ and ${\boldsymbol{V}}^f_2\boldsymbol{\Sigma }^f_2$ , and the inner product of coordinates of a document and coordinates of a term does not approximate the corresponding value in ${\boldsymbol{F}}$ . Directions from the origin can be interpreted, though, as the double use of the singular values only leads to relatively reduced coordinates on the second dimension in comparison to the coordinates on the first dimension.

The two-dimensional representation of LSA-RAW is shown in Figure 1a. In Figure 1a, Euclidean distances between documents and between terms reveal the similarity of documents and terms, respectively. For example, documents 5 and 6 are close, and similar in the sense that their Euclidean distance is small. For these two documents, the Euclidean distance in the matrix ${\boldsymbol{F}}$ is 1.414, and in the first two dimensions it is 1.279, so the first two dimensions provide an adequate representation of their similarity. The value 1.279 is much smaller than the Euclidean distances between documents 5 and 1 (3.338), 5 and 2 (5.248), 5 and 3 (2.205), and 5 and 4 (3.988) as well as the Euclidean distances between documents 6 and 1 (3.638), 6 and 2 (5.262), 6 and 3 (2.975), and 6 and 4 (3.681). On the first dimension, all documents and terms have a negative coordinate (see above). There is an order of 5, 6, 3, 1, 4, and 2 on the first dimension. This order is related to the row margins of Table 1, where 2 and 4 have the highest frequencies and therefore are further away from the origin. Overall, the two-dimensional representation of the documents reveals a mix of the sizes of the documents, the row margins $\Sigma _j f_{ij}$ , and the relative use of the terms by the documents, that is, for row $i$ this is the vector of elements $f_{ij}/\Sigma _j f_{ij}$ , also known as the row profile for row $i$ . This mix makes the graphic representation difficult to interpret. Similarly, porsche and ferrari are lower left but close to the origin, tiger, cheetah, and lion are upper left and further away from the origin, and jaguar is far away at the lower left. Also there is a mix of the sizes of the terms, that is, for column $j$ this is column margin $\Sigma _i f_{ij}$ , and the relative use of the documents by the terms, that is, for column $j$ this is the vector of elements $f_{ij}/\Sigma _i f_{ij}$ , also known as the column profile for column $j$ . The terms porsche and ferrari are related to documents 5 and 6 as they have the same position w.r.t. the origin, and similarly for tiger, cheetah, and lion to documents 1, 2, and 3, and jaguar to document 4.

Although the first dimension accounts for $85.5$ % of the total sum of squared singular values, it provides little information about the relations among documents and terms. In particular, from Table 1 we expect that documents 1–3 are similar, documents 5 and 6 are similar, and document 4 is in-between; term jaguar is between cat terms (tiger, cheetah, and lion) and car terms (porsche and ferrari), but we cannot see that from the first dimension. This is because the margins of Table 1 play a dominant role in the first dimension.

2.2 LSA of weighted document-term matrix

Weighting can be used to prevent differential lengths of documents from having differential effects on the representation, or be used to impose certain preconceptions of which terms are more important (Deerwester et al., Reference Deerwester, Dumais, Furnas, Landauer and Harshman1990). The frequencies $f_{ij}$ in the raw document-term matrix ${\boldsymbol{F}}$ can be transformed with the aim to provide a better approximation of the interrelations between documents and terms (Nakov, Popova, and Mateev, Reference Nakov, Popova and Mateev2001). The weight $w_{ij}$ for term $j$ in document $i$ is normally expressed as a product of three components (Salton and Buckley, Reference Salton and Buckley1988; Kolda and O’leary, Reference Kolda and O’leary1998; Ab Samat et al., Reference Ab Samat, Murad, Abdullah and Atan2008):

(4) \begin{equation} w_{ij} =L(i,j) \times G(j) \times N(i) \end{equation}

where the local weighting $L(i,j)$ is the weight of term $j$ in document $i$ , the global weighting $G(j)$ is the weight of the term $j$ in the entire document set, and $N(i)$ is the normalization component for document $i$ .

When $L(i,j) = f(i,j)$ , $G(j)=1$ , and $N(i)=1$ , the weighted ${\boldsymbol{F}}$ is equal to ${\boldsymbol{F}}$ . In matrix notation, Equation (4) can be expressed as ${\boldsymbol{W}} ={\boldsymbol{N}}{\boldsymbol{L}}{\boldsymbol{G}}$ , where ${\boldsymbol{N}}$ is a diagonal matrix with diagonal elements $N(i)$ and ${\boldsymbol{G}}$ is a diagonal matrix with diagonal elements $G(j)$ . Notice that pre- or post-multiplying by a diagonal matrix leaves the rank of the matrix ${\boldsymbol{L}}$ intact.

We examine two common ways to weight $f_{ij}$ . One is row normalization (Salton and Buckley, Reference Salton and Buckley1988; Ab Samat et al., Reference Ab Samat, Murad, Abdullah and Atan2008) with L1 and L2. The other is TF-IDF (Dumais, Reference Dumais1991).

2.2.1 SVD of matrix with row-normalized elements with L1

In row-normalized weighting with L1, we use Equation (4) with $L(i,j)=f_{ij}$ , $G(j)=1$ , and $N(i)=1/\sum _{j=1}^n{f_{ij}}$ and apply an SVD to this transformed matrix that we denote as ${\boldsymbol{F}}^{L1}$ , which consists of the row profiles of ${\boldsymbol{F}}$ . See Table 3. The last row, the average row profile, is the row profile of the column margins of Table 1.

Table 3. Row profiles of ${\boldsymbol{F}}$

We perform LSA of ${\boldsymbol{F}}^{L1}$ and find Table 2, part LSA-NROWL1. This shows that a rank 2 matrix approximates the data well as 0.692 + 0.289 = 0.981 of the total sum of squared singular values is explained by these two dimensions. The first two columns of LSA of ${\boldsymbol{F}}^{L1}$ can be used to approximate ${\boldsymbol{F}}^{L1}$ ; see Equation (5):

(5) \begin{equation} \begin{aligned} {\boldsymbol{F}}^{L1} \approx {\boldsymbol{U}}^{L1}_2\boldsymbol{\Sigma }^{L1}_2({\boldsymbol{V}}^{L1}_2)^T &= \left [ \begin{array}{r@{\quad}r} -0.423& 0.327 \\[1pt] -0.415& 0.332\\[1pt] -0.408& 0.349\\[1pt] -0.401& 0.097\\[1pt] -0.384& -0.575\\[1pt] -0.417& -0.567 \end{array} \right ]\left [ \begin{array}{c@{\quad}c} 1.070 & 0\\[1pt] 0 & 0.692\\[1pt] \end{array} \right ] \left [ \begin{array}{r@{\quad}r} -0.347& 0.374\\[1pt] -0.382 & 0.417\\[1pt] -0.326& 0.350 \\[1pt] -0.692 &-0.174\\[1pt] -0.232& -0.428\\[1pt] -0.310& -0.592 \end{array} \right ]^T \end{aligned} \end{equation}

Documents and terms can be projected on a two-dimensional space using ${\boldsymbol{U}}^{L1}_2\boldsymbol{\Sigma }^{L1}_2$ and ${\boldsymbol{V}}^{L1}_2\boldsymbol{\Sigma }^{L1}_2$ as coordinates; see Figure 1b. In this representation, documents 1, 2, and 3 are quite close, and so are 5 and 6. Also, the terms ferrari and porsche are close and related to 5 and 6, tiger, lion, and cheetah are close and related to 1, 2, and 3.

Although the first dimension accounts for $69.2$ % of the total sum of squared singular values, this dimension does not provide information about different use of terms by the documents as all documents have a similar coordinate. This is caused by the same marginal value 1 for each of the documents in ${\boldsymbol{F}}^{L1}$ , which leads to almost the same distance from the origin. Also, we would expect jaguar to be in between cat terms (tiger, cheetah, and lion) and car terms (porsche and ferrari), but on the first dimension it appears as a separate, third group. This is caused by the high values in its column in ${\boldsymbol{F}}^{L1}$ , which lead to a larger distance from the origin.

Table 4. A row-normalized document-term matrix ${\boldsymbol{F}}^{L2}$

2.2.2 SVD of matrix with row-normalized elements with L2

In row-normalized weighting with L2, we use Equation (4) with $L(i,j)=f_{ij}$ , $G(j)=1$ , and $N(i)=1/\sqrt{\sum _{j=1}^n{f_{ij}^2}}$ . The transformed matrix, denoted as ${\boldsymbol{F}}^{L2}$ , is shown in Table 4. We then perform LSA on Table 4. Table 2, part LSA-NROWL2, indicates that a rank 2 matrix approximates the data well, as the sum of the PSSSV of the first two dimensions 0.731 + 0.251 = 0.982 contributes to 98.2% of the total sum of squared singular values. The first two columns of LSA of ${\boldsymbol{F}}^{L2}$ can be used to approximate ${\boldsymbol{F}}^{L2}$ ; see Equation (6):

(6) \begin{equation} \begin{aligned} {\boldsymbol{F}}^{L2} \approx {\boldsymbol{U}}^{L2}_2\boldsymbol{\Sigma }^{L2}_2({\boldsymbol{V}}^{L2}_2)^T &= \left [ \begin{array}{r@{\quad}r} -0.443& 0.259\\[5pt] -0.445& 0.271\\[5pt] -0.444& 0.295\\[5pt] -0.476& 0.017\\[5pt] -0.293& -0.635\\[5pt] -0.310& -0.608 \end{array} \right ]\left [ \begin{array}{c@{\quad}c} 2.095 & 0\\[5pt] 0 & 1.228\\[5pt] \end{array} \right ] \left [ \begin{array}{r@{\quad}r} -0.394& 0.323\\[5pt] -0.432& 0.362\\[5pt] -0.374& 0.304 \\[5pt] -0.659& -0.263\\[5pt] -0.178& -0.460\\[5pt] -0.227& -0.625 \end{array} \right ]^T \end{aligned} \end{equation}

Documents and terms can be projected on a two-dimensional space using ${\boldsymbol{U}}^{L2}_2\boldsymbol{\Sigma }^{L2}_2$ and ${\boldsymbol{V}}^{L2}_2\boldsymbol{\Sigma }^{L2}_2$ as coordinates; see Figure 1c. In this representation, documents 1, 2, and 3 are quite close, and so are 5 and 6. Also, the terms ferrari and porsche are close and related to 5 and 6, tiger, lion, and cheetah are close and related to 1, 2, and 3.

Although the first dimension accounts for $73.1$ % of the total sum of squared singular values, and so, a major portion of the information in the matrix, we do not find the important aspect in the data that document 4 should be in between documents 1–3 on the one hand and documents 5–6 on the other hand on this dimension. This is caused by the high values in the row for doc4 in Table 4, which lead to a larger distance from the origin than the other documents have. Also, we would expect jaguar to be in between cat terms (tiger, cheetah, and lion) and car terms (porsche and ferrari), but on the first dimension it appears as a separate, third group. This is caused by the high values in its column in Table 4, which lead to a larger distance from the origin.

2.2.3 SVD of the TF-IDF matrix

TF-IDF is one commonly used transformation of text data. We use Equation (4) with $L(i,j)=f_{ij}$ , $G(j)=1+\text{log}(\frac{n\text{docs}}{df_j})$ , and $N(i)=1$ , one form of TF-IDF, where $n$ docs is the number of documents in the set and $df_j$ is the number of documents where term $j$ appears, and then apply an SVD to this transformed matrix that we denote as ${\boldsymbol{F}}^{\text{TF-IDF}}$ ; see Table 5. As is common in the literature, here we choose 2 as the base of the logarithmic function.

Table 5. A document-term matrix ${\boldsymbol{F}}^{\text{TF-IDF}}$

We perform LSA of Table 5 and find Table 2, part LSA-TFIDF. This shows that a rank 2 matrix approximates the data well as 0.786 + 0.194 = 0.980 of the total sum of squared singular values is explained by these two dimensions. The matrix ${\boldsymbol{F}}^{\text{TF-IDF}}$ in Table 5 is approximated in the first two dimensions as follows:

(7) \begin{equation} \begin{aligned} {\boldsymbol{F}}^{\text{TF-IDF}} &\approx {\boldsymbol{U}}^{\text{TF-IDF}}_2\boldsymbol{\Sigma }^{\text{TF-IDF}}_2({\boldsymbol{V}}^{\text{TF-IDF}}_2)^T \\[5pt] & =\left [ \begin{array}{r@{\quad}r} -0.411 & 0.175\\[5pt] -0.654 & 0.296\\[5pt] -0.239 & 0.112\\[5pt] -0.563& -0.245\\[5pt] -0.086& -0.469\\[5pt] -0.148& -0.768 \end{array} \right ]\left [ \begin{array}{c@{\quad}c} 11.878 & 0\\[5pt] 0 & 5.898 \\[5pt] \end{array} \right ] \left [ \begin{array}{r@{\quad}r} -0.466& 0.151 \\[5pt] -0.554& 0.231 \\[5pt] -0.499 & 0.184\\[5pt] -0.429& -0.236\\[5pt] -0.134& -0.502\\[5pt] -0.159& -0.763 \end{array} \right ]^T \end{aligned} \end{equation}

Figure 1d is a two-dimensional plot of the documents and terms using ${\boldsymbol{U}}^{\text{TF-IDF}}_2\boldsymbol{\Sigma }^{\text{TF-IDF}}_2$ and ${\boldsymbol{V}}^{\text{TF-IDF}}_2\boldsymbol{\Sigma }^{\text{TF-IDF}}_2$ as coordinates for the $6 \times 6$ sample document-term matrix ${\boldsymbol{F}}^{\text{TF-IDF}}$ . The configuration of documents in Figure 1d is very similar to that in Figure 1a. The configuration of terms in Figure 1d is different from that of terms in Figure 1a. In Figure 1d, there is an order of porsche, ferrari, jaguar, lion, cheetah, and tiger on the first dimension, whereas in Figure 1a, there is an order of porsche, ferrari, lion, cheetah, tiger, and jaguar on the first dimension. Compared with Figure 1a, the first dimension of Figure 1d shows that jaguar is in between cat terms (tiger, cheetah, and lion) and car terms (porsche and ferrari).

2.2.4 Out-of-sample documents

Representing out-of-sample documents in the $k$ -dimensional subspace of LSA is important for many applications. Suppose an out-of-sample document ${\boldsymbol{d}}$ is a row vector. To represent ${\boldsymbol{d}}$ in lower-dimensional space, first the out-of-sample document ${\boldsymbol{d}}$ can be transformed in the same way as the original documents (Dumais, Reference Dumais1991). Transformations for the above four applications of LSA are ${\boldsymbol{d}}_w^f = {\boldsymbol{d}}$ , ${\boldsymbol{d}}_w^{L1} = {\boldsymbol{d}}/\sum _{j=1}^nd_j$ , ${\boldsymbol{d}}_w^{L2} = {\boldsymbol{d}}/\sqrt{\sum _{j=1}^n{d_{j}^2}}$ , and ${\boldsymbol{d}}_w^{\text{TF-IDF}} = [d_1G(1), \cdots, d_nG(n)]$ . The coordinates of the out-of-sample document ${\boldsymbol{d}}$ in LSA-RAW, LSA-NROWL1, LSA-NROWL2, and LSA-TFIDF are then calculated by ${\boldsymbol{d}}_w^f{\boldsymbol{V}}^f$ , ${\boldsymbol{d}}_w^{L1}{\boldsymbol{V}}^{L1}$ , ${\boldsymbol{d}}_w^{L2}{\boldsymbol{V}}^{L2}$ , and ${\boldsymbol{d}}_w^{\text{TF-IDF}}{\boldsymbol{V}}^{\text{TF-IDF}}$ , respectively (Aggarwal, Reference Aggarwal2018).

2.3 Conclusions regarding LSA of different matrices

In the raw document-term matrix, the relationships among the documents and terms is blurred by differences in margins arising from differing document lengths and marginal term frequencies. Thus LSA of the raw matrix leads to a mix of margins, and relationships among documents and terms. In order to provide a better approximation of the interrelations between documents and terms, weighting schemes were used.

Normalizations of the documents have a beneficial effect. Yet, the properties of the frequencies that are evident from Table 1 where we expect, for example, that jaguar lies in between porsche and ferrari on the one hand and tiger, cheetah, and lion on the other hand, are not fully represented on the first dimension. This is due to the fact that the column margins of Tables 3 and 4 still play a role on the first dimension. The TF-IDF transformation also has a positive effect. Yet LSA is not successful. For example, we expect that documents 1–3 are similar, 5 and 6 are similar, and document 4 is in-between, but this order is not found in the first dimension. This is due to the fact that the row margins of Table 5 still play a role on the first dimension.

Generally, solutions of LSA have the drawback that they include the effect of the margins as well as the dependence. In the first dimension, these margins play a dominant role as all points depart in the same direction from the origin. We can try to repair this property of LSA, by applying transformations of the rows and columns of Table 1 simultaneously. However, the transformations appear ad hoc. Instead, we present in the next section a different technique, which better fits the properties of the data: CA.

3. Correspondence analysis

CA provides a low-dimensional representation of the interaction or dependence between the rows and columns of the contingency table (Greenacre and Hastie, Reference Greenacre and Hastie1987), which can be used to reveal the structure in the data (Hayashi, Reference Hayashi1992). CA has been proposed multiple times, apparently independently, emphasizing different properties of the technique (Gifi, Reference Gifi1990). Some important contributions are provided in the Japanese literature, by Hayashi (Reference Hayashi1956, Reference Hayashi1992), who emphasizes the property of CA that it maximizes the correlation coefficient between the row and column variable by assigning numerical scores to these variables; in the French literature, by Benzécri (Reference Benzécri1973), who emphasizes a distance interpretation, where Greenacre (Reference Greenacre1984) expressed Benzécri’s work in a more convenient mathematical notation; and in the Dutch literature, by Gifi (Reference Gifi1990) and Michailidis and De Leeuw (Reference Michailidis and De Leeuw1998), who emphasize optimal scaling properties. We present CA here mainly from the French perspective.

The aim of CA as developed by Benzécri is to find a representation of the rows (columns) of frequency matrix ${\boldsymbol{F}}$ in such a way that Euclidean distances between the rows (columns) in the representation correspond to so-called $\chi ^2$ -distances between rows (columns) of ${\boldsymbol{F}}$ (Gifi, Reference Gifi1990). We work with ${\boldsymbol{P}}$ with elements $p_{ij} = f_{ij}/f_{++}$ , where $f_{++}$ is the sum of all elements of ${\boldsymbol{F}}$ . In the $\chi ^2$ -distance, profiles play an important role. The squared $\chi ^2$ -distance between the $k$ th row profile with elements $p_{kj}/r_k$ and the $l$ th row profile with elements $p_{lj}/r_l$ is

(8) \begin{equation} \delta _{kl}^2 = \sum _j{\frac{\left (p_{kj}/r_k - p_{lj}/r_l\right )^2}{c_j}} \end{equation}

where $r_{i}$ (also called the average column profile) and $c_{j}$ (the average row profile) are the row and column sums of ${\boldsymbol{P}}$ , respectively. Thus, the difference between the $j$ th elements of the two profiles is weighted by column margin (i.e., the last row of Table 3), $c_j$ , so that this difference plays a relatively more important role in the $\chi ^2$ -distance if it stems from a column having a small value $c_j$ .

A representation where Euclidean distances between the rows of the matrix are equal to $\chi ^2$ -distances is found as follows. In matrix notation, the matrix whose Euclidean distances between the rows are equal to $\chi ^2$ -distances between rows of ${\boldsymbol{F}}$ is equal to ${\boldsymbol{D}}_r^{-1}{\boldsymbol{P}}{\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ , where ${\boldsymbol{D}}_r$ is a diagonal matrix with $r_i$ as diagonal elements and ${\boldsymbol{D}}_c$ is a diagonal matrix with $c_j$ as diagonal elements. Suppose we take the SVD of

(9) \begin{equation} {\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{P}}{\boldsymbol{D}}_{c}^{-\frac{1}{2}} = {\boldsymbol{U}}^{sp} \boldsymbol{\Sigma }^{sp} ({\boldsymbol{V}}^{sp})^T \end{equation}

Here, ${\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{P}}{\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ is a matrix with standardized proportions, hence the superscripts $sp$ on the right-hand side of the equation. Then, if we premultiply both sides of Equation (9) with ${\boldsymbol{D}}_r^{-\frac{1}{2}}$ , we get

(10) \begin{equation} {\boldsymbol{D}}_r^{-1}{\boldsymbol{P}}{\boldsymbol{D}}_{c}^{-\frac{1}{2}} = {\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{U}}^{sp}\boldsymbol{\Sigma }^{sp} ({\boldsymbol{V}}^{sp})^T \end{equation}

Thus, a representation using the rows of ${\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{U}}^{sp}\boldsymbol{\Sigma }^{sp}$ as row coordinates leads to Euclidean distances between these row points being equal to $\chi ^2$ -distances between rows of ${\boldsymbol{F}}$ . Similar to Equation (8), we can also define $\chi ^2$ -distances between the columns of ${\boldsymbol{F}}$ , and in matrix notation this leads to the matrix ${\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{P}}{\boldsymbol{D}}_{c}^{-1}$ . Then, in a similar way as for the $\chi ^2$ -distances for the rows, Equation (9) can be used as an intermediate step to go to a solution for the columns. Postmultiplying the left- and right-hand sides in Equation (9) by ${\boldsymbol{D}}_c^{-\frac{1}{2}}$ provides us with the coordinates for a representation where Euclidean distances between the column points (the rows of ${\boldsymbol{D}}_c^{-\frac{1}{2}}{\boldsymbol{V}}^{sp}\boldsymbol{\Sigma }^{sp}$ as coordinates for these columns) are equal to $\chi ^2$ -distances between the columns of ${\boldsymbol{F}}$ . Notice that Equation (9) plays the dual role of an intermediate step in going to a solution both for the rows and the columns.

The matrices ${\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{U}}^{sp}\boldsymbol{\Sigma }^{sp}$ and ${\boldsymbol{D}}_c^{-\frac{1}{2}}{\boldsymbol{V}}^{sp}\boldsymbol{\Sigma }^{sp}$ have a first column being equal to 1, a so-called artificial dimension. This artificial dimension reflects the fact that the row margins of the matrix ${\boldsymbol{D}}_r^{-1}{\boldsymbol{P}}$ with the row profiles of Table 1 are 1 and the column margins of the matrix ${\boldsymbol{P}}{\boldsymbol{D}}_c^{-1}$ with the column profiles of Table 1 are 1. This artificial dimension is eliminated by not taking the SVD of ${\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{P}}{\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ but of ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ , where the elements of ${\boldsymbol{E}}$ are defined as the product of the margins $r_i$ and $c_j$ . Due to subtracting ${\boldsymbol{E}}$ from ${\boldsymbol{P}}$ , the rank of ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ is $m-1$ , which is 1 less than the rank of ${\boldsymbol{F}}$ . Notice that the elements of ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ are standardized residuals under the independence model, and the sum of squares of these elements yields the so-called total inertia, which is equal to the Pearson $\chi ^2$ statistic divided by sample size $f_{++}$ . By taking the SVD of the matrix of standardized residuals, we get

(11) \begin{equation} {\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}} = {\boldsymbol{U}}^{sr} \boldsymbol{\Sigma }^{sr} ({\boldsymbol{V}}^{sr})^T \end{equation}

and

(12) \begin{equation} {\boldsymbol{D}}_r^{-1}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-1} = \boldsymbol{\Phi }^{sr}\boldsymbol{\Sigma }^{sr} (\boldsymbol{\Gamma }^{sr})^T \end{equation}

where $\boldsymbol{\Phi }^{sr}={\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{U}}^{sr}$ and $\boldsymbol{\Gamma }^{sr} = {\boldsymbol{D}}_c^{-\frac{1}{2}}{\boldsymbol{V}}^{sr}$ . We use the abbreviation $sr$ for the matrices on the right-hand side of Equation (11) to refer to the matrix of standardized residuals on the left-hand side of the equation. CA simultaneously provides a geometric representation of row profiles and column profiles of Table 1, where the effects of row margins and column margins of Table 1 are eliminated. $\boldsymbol{\Phi }^{sr}$ and $\boldsymbol{\Gamma }^{sr}$ are called standard coordinates of rows and columns, respectively. They have the property that their weighted average is 0 and weighted sum of squares is 1:

(13) \begin{equation} \mathbf{1}^T{\boldsymbol{D}}_r\boldsymbol{\Phi }^{sr} = \mathbf{0}^T = \mathbf{1}^T{\boldsymbol{D}}_c\boldsymbol{\Gamma }^{sr} \end{equation}

and

(14) \begin{equation} (\boldsymbol{\Phi }^{sr})^T {\boldsymbol{D}}_r \boldsymbol{\Phi }^{sr} = \mathbf{I} = (\boldsymbol{\Gamma }^{sr})^T {\boldsymbol{D}}_c \boldsymbol{\Gamma }^{sr} \end{equation}

Equation (13) reflects the fact that the row and column margins of ${\boldsymbol{P}}-{\boldsymbol{E}}$ vanish (Van der Heijden, De Falguerolles, and De Leeuw, Reference Van der Heijden, De Falguerolles and De Leeuw1989).

We can make graphic displays using $\boldsymbol{\Phi }^{sr}_k\boldsymbol{\Sigma }^{sr}_k$ and $\boldsymbol{\Gamma }^{sr}_k\boldsymbol{\Sigma }^{sr}_k$ as coordinates, which has the advantage that Euclidean distances between the points approximate $\chi ^2$ -distances both for the rows of ${\boldsymbol{F}}$ and for the columns of ${\boldsymbol{F}}$ , but it has the drawback that $\boldsymbol{\Sigma }^{sr}_k$ is used twice. We can also make graphic displays using $\boldsymbol{\Phi }^{sr}_k\boldsymbol{\Sigma }^{sr}_k$ and $\boldsymbol{\Gamma }^{sr}_k$ , or $\boldsymbol{\Phi }^{sr}_k$ and $\boldsymbol{\Gamma }^{sr}_k\boldsymbol{\Sigma }^{sr}_k$ . Thus, from Equation (12), this has the advantage that the inner product of the coordinates of a document and the coordinates of a term approximates the corresponding value in ${\boldsymbol{D}}_r^{-1}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-1}$ .

If we choose $\boldsymbol{\Phi }^{sr}\boldsymbol{\Sigma }^{sr}$ for the row points and $\boldsymbol{\Gamma }^{sr}$ for the column points, then CA has the property that the row points are in weighted average of the column points, where the weights are the row profile values. Actually, $\boldsymbol{\Gamma }^{sr}$ can be seen as coordinates for the extreme row profiles projected onto the subspace. The extreme row profiles are totally concentrated into one of the terms. For example, $[0,0,1,0,0,0]$ represents the row profile of a document that is totally concentrated into cheetah. At the same time, if we choose $\boldsymbol{\Phi }^{sr}$ for the row points and $\boldsymbol{\Gamma }^{sr}\boldsymbol{\Sigma }^{sr}$ for the column points, column points are in weighted average of row points, where the weights are the column profile values. In a similar way as for the rows, $\boldsymbol{\Phi }^{sr}$ provide coordinates for the extreme column profiles projected onto the subspace. The relationship between these row points and column points can be shown by rewriting Equation (11) and using Equation (13) as:

(15) \begin{equation} {\boldsymbol{D}}_r^{-1}{\boldsymbol{P}}\boldsymbol{\Gamma }^{sr} = \boldsymbol{\Phi }^{sr}\boldsymbol{\Sigma }^{sr} \end{equation}

and

(16) \begin{equation} {\boldsymbol{D}}_c^{-1}{\boldsymbol{P}}^T\boldsymbol{\Phi }^{sr} = \boldsymbol{\Gamma }^{sr}\boldsymbol{\Sigma }^{sr} \end{equation}

These equations are called the transition formulas. In fact, using transition formulas is one of the ways in which the solution of CA can be obtained: starting from arbitrary values for the columns, one first centers and standardizes the column coordinates so that the weighted sum is 0 and the weighted sums of squares is 1, next places the rows in the weighted average of the columns, then places the columns in the weighted average of the rows, and so on, until convergence. This is known as reciprocal averaging (Hill, Reference Hill1973, Reference Hill1974). Using the transition formula (15), the coordinates of the out-of-sample document ${\boldsymbol{d}}$ is $(\boldsymbol{d}/\sum _{j=1}^nd_j)\boldsymbol{\Gamma }^{sr}$ (Greenacre, Reference Greenacre2017).

The origin in the graphic representation for the rows stands for the average row profile, which can be seen as follows. Let ${\boldsymbol{D}}_r^{-1}{\boldsymbol{P}}{\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ be the matrix where Euclidean distances between the rows are $\chi ^2$ -distances between rows of ${\boldsymbol{F}}$ . Assume we plot the rows of this matrix using the $n$ elements of each row as coordinates. Then, eliminating the artificial dimension in ${\boldsymbol{D}}_r^{-1}{\boldsymbol{P}}{\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ leads to the subtraction of the average row profile from each row, as ${\boldsymbol{D}}_r^{-1}{\boldsymbol{E}}$ is a matrix with the average row profile in each row. In other words, the cloud of row points is translated to the origin, with the average row profile being exactly in the origin (compare Equation (13): $\mathbf{0}^T = \mathbf{1}^T{\boldsymbol{D}}_c\boldsymbol{\Gamma }^{sr}$ ). When two row points are departing in the same way from the origin, they depart in the same way from the average profile, and when two row points are on opposite sides of the origin, they depart in opposite ways from the average profile. If the documents and terms are statistically independent, then $p_{ij}/r_i = c_j$ , and all document profiles would lie in the origin. Thus, comparing row profiles with the origin is a way to study the departure from independence and to study the relations between documents and terms. Similarly, the origin in the graphic representation for the columns stands for average column profile.

We now analyze the example discussed in the LSA section. There are three steps to obtain the CA solution. Step 1: make the matrix ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ of standardized residuals; Step 2: compute the SVD of the matrix; Step 3: derive $\boldsymbol{\Phi }^{sr} = {\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{U}}^{sr}$ and $\boldsymbol{\Gamma }^{sr} = {\boldsymbol{D}}_c^{-\frac{1}{2}}{\boldsymbol{V}}^{sr}$ , and postmultiply $\boldsymbol{\Phi }^{sr}$ and $\boldsymbol{\Gamma }^{sr}$ by $\boldsymbol{\Sigma }^{sr}$ to obtain the coordinates. Table 6 shows the matrix ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ of standardized residuals (in lower-case notation, the elements of the matrix are $(p_{ij} - e_{ij})/\sqrt{e_{ij}}$ ).

Table 6. The matrix ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ of standardized residuals

We perform an SVD of ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ in Table 6 and find Table 7. Due to subtracting ${\boldsymbol{E}}$ from ${\boldsymbol{P}}$ , the rank of the matrix in Table 6 is 4, which is 1 less than that in Table 1. The proportion of the total inertia explained by only the first dimension accounts for 0.932 of the total inertia. The matrix ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ in Table 6 is approximated in the first two dimensions as follows:

Table 7. The singular values, the inertia, and the proportions of explained total inertia for each dimension of CA

Figure 2. The data of Table 1 using CA for (a) symmetric map and (b) asymmetric map.

(17) \begin{equation} \begin{aligned} {\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}} &\approx {\boldsymbol{U}}^{sr}_2\boldsymbol{\Sigma }^{sr}_2({\boldsymbol{V}}^{sr}_2)^T \\[5pt] &= \left [ \begin{array}{r@{\quad}r@{\quad}r@{\quad}r@{\quad}r@{\quad}r} -0.286 & 0.789\\[5pt] -0.368& -0.517 \\[5pt] -0.231& -0.025\\[5pt] 0.007& -0.138\\[5pt] 0.547& -0.206\\[5pt] 0.656& 0.220 \end{array} \right ]\left [ \begin{matrix} 0.689 & 0\\[5pt] 0 & 0.131 \end{matrix} \right ] \left [ \begin{array}{r@{\quad}r@{\quad}r@{\quad}r@{\quad}r@{\quad}r} -0.301& 0.544 \\[5pt] -0.338& 0.090\\[5pt] -0.303& -0.761\\[5pt] 0.102& 0.152\\[5pt] 0.512& -0.275\\[5pt] 0.656& 0.136 \end{array} \right ]^T \end{aligned} \end{equation}

Figure 2a is the map with a symmetric role for the rows and the columns, having $\boldsymbol{\Phi }^{sr}_2\boldsymbol{\Sigma }^{sr}_2$ and $\boldsymbol{\Gamma }^{sr}_2\boldsymbol{\Sigma }^{sr}_2$ as coordinates. The larger the deviations from document (term) points to the origin are, the larger the dependence between documents and terms. Looking only at the first dimension and document profiles’ positions, we can see that the groups furthest apart are documents 1–3 on the left-hand side, opposed to documents 5–6 on the right-hand side. They differ in opposite ways from the average row profile that lies in the origin. For the term points on the first dimension, the cat terms (tiger, cheetah, and lion) lie on the left, and car terms (porsche and ferrari) on the right. They differ in opposite ways from the average column profile. Importantly, CA clearly displays the properties we see in the data matrix, as document 4 lies between documents 1–3 and documents 5–6, and the term jaguar lies between cat terms and car terms, unlike all four of the LSA-based analyses presented in Figure 1.

Figure 2b is the asymmetric map with documents in the weighted average of the terms ( $\boldsymbol{\Phi }^{sr}_2\boldsymbol{\Sigma }^{sr}_2$ and $\boldsymbol{\Gamma }^{sr}_2$ as coordinates, notice that the position of the documents is identical as in Figure 2a). From this graphic display, we can study the position of the documents as they are in the weighted average of the terms, using the row profile elements as weights. For example, document 1 is closer to lion and tiger than to porsche and ferrari, because it has higher profile values than average values on terms lion and tiger (both 0.286 in comparison with the average profile values 0.171 and 0.195) and lower profile values on the terms porsche and ferrari (both 0.000 in comparison to 0.073 and 0.098); see Table 3. Thus, document 1 is pulled into the direction of lion and tiger.

3.1 Conclusions regarding CA

In CA, an SVD is applied to the matrix ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ of standardized residuals. Due to ${\boldsymbol{E}}$ , in CA the effect of the margins is eliminated and a solution only displays the relationships among documents and terms. In CA, all points are scattered around the origin and the origin represents the profile of the row and column margins of ${\boldsymbol{F}}$ .

In comparison, LSA also tries to capture the relationships among documents and terms, which is not easy. The reason is that these relations are blurred by the effect of the margins that are also displayed in the LSA solution. CA does not have this property. Therefore, it appears that CA is a better tool for information retrieval, natural language processing, and text mining.

4. A unifying framework

Here, we present a unifying framework that integrates LSA and CA. This section also serves the purpose of showing their similarities and their differences.

To first summarize LSA (see Section 2.2 for details), a matrix is weighted, and the weighted matrix is decomposed. Assume we start off with the document-term matrix ${\boldsymbol{F}}$ , the row weights of ${\boldsymbol{F}}$ are collected in the diagonal matrix ${\boldsymbol{N}}$ , the column weights in the diagonal matrix ${\boldsymbol{G}}$ , and there may be local weighting of the elements $f_{ij}$ of ${\boldsymbol{F}}$ leading to a locally weighted matrix ${\boldsymbol{L}}$ . Thus, the weighted matrix ${\boldsymbol{W}}$ can be written as the matrix product:

(18) \begin{equation} {\boldsymbol{W}} ={\boldsymbol{N}}{\boldsymbol{L}}{\boldsymbol{G}} \end{equation}

Subsequently, in LSA, the matrix ${\boldsymbol{W}}$ is decomposed using SVD into a product of three matrices: the orthonormal matrix ${\boldsymbol{U}}$ , the diagonal matrix $\boldsymbol{\Sigma }$ with singular values in descending order, and the orthonormal matrix ${\boldsymbol{V}}$ , namely

(19) \begin{equation} {\boldsymbol{W}} = {\boldsymbol{U}}\boldsymbol{\Sigma }{\boldsymbol{V}}^T \end{equation}

with

(20) \begin{equation} {\boldsymbol{U}}^T{\boldsymbol{U}} = {\boldsymbol{I}} = {\boldsymbol{V}}^T{\boldsymbol{V}} \end{equation}

Graphic representations are usually made using ${\boldsymbol{U}}\boldsymbol{\Sigma }$ as coordinates for the rows and ${\boldsymbol{V}}\boldsymbol{\Sigma }$ for the columns.

In contrast, in CA we take the SVD of the matrix of standardized residuals. Let ${\boldsymbol{P}}$ be the matrix with proportions $p_{ij} = f_{ij}/f_{++}$ , where $f_{++}$ is the sum of all elements of ${\boldsymbol{F}}$ ; let ${\boldsymbol{E}}$ be the matrix with expected proportions under independence $e_{ij} = r_{i}c_{j}$ , where $r_{i}$ and $c_{j}$ are the row and column sums of ${\boldsymbol{P}}$ , respectively; let ${\boldsymbol{D}}_{\boldsymbol{r}}$ and ${\boldsymbol{D}}_{\boldsymbol{c}}$ be diagonal matrices with row and column sums $r_{i}$ and $c_{j}$ , respectively. Thus, the matrix of standardized residuals is ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ . If we take the SVD of this matrix, we get (11),

(21) \begin{equation} {\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}} = {\boldsymbol{U}} \boldsymbol{\Sigma } {\boldsymbol{V}}^T \end{equation}

In CA, the matrices ${\boldsymbol{U}}$ and ${\boldsymbol{V}}$ are further adjusted by:

(22) \begin{equation} \boldsymbol{\Phi }={\boldsymbol{D}}_r^{-\frac{1}{2}}{\boldsymbol{U}}, \\[5pt] \boldsymbol{\Gamma } = {\boldsymbol{D}}_c^{-\frac{1}{2}}{\boldsymbol{V}} \end{equation}

so that we can write

(23) \begin{equation} {\boldsymbol{D}}_r^{-1}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-1} = \boldsymbol{\Phi }\boldsymbol{\Sigma } \boldsymbol{\Gamma }^T \end{equation}

with

(24) \begin{equation} \boldsymbol{\Phi }^T {\boldsymbol{D}}_{\boldsymbol{r}} \boldsymbol{\Phi } = {\boldsymbol{I}} = \boldsymbol{\Gamma }^T {\boldsymbol{D}}_{\boldsymbol{c}} \boldsymbol{\Gamma } \end{equation}

Graphic representations are usually made using $\boldsymbol{\Phi } \boldsymbol{\Sigma }$ and $\boldsymbol{\Gamma } \boldsymbol{\Sigma }$ as coordinates for the rows and columns, respectively.

This brings us to the point where we can formulate a unifying framework. We distinguish the matrix to be analyzed and the decomposition of this matrix. For the matrix to be analyzed, the weighted matrix defined in (18) can be used by LSA as well as by CA. Equation (18) is sufficiently general for LSA. For CA, using (21), we set ${\boldsymbol{N}} = {\boldsymbol{D}}_{\boldsymbol{r}}^{-\frac{1}{2}}$ , ${\boldsymbol{L}} = {\boldsymbol{P}} - {\boldsymbol{E}}$ , and ${\boldsymbol{G}} = {\boldsymbol{D}}_{\boldsymbol{c}}^{-\frac{1}{2}}$ . This shows that the matrix decomposed in CA in (21) can be formulated in the LSA framework in (18).

The decomposition used in LSA leads to orthonormal matrices ${\boldsymbol{U}}$ and ${\boldsymbol{V}}$ used for coordinates; see (20), whereas in CA the decomposition leads to weighted orthonormal matrices $\boldsymbol{\Phi }$ and $\boldsymbol{\Gamma }$ ; see (24). If we rewrite (20) as ${\boldsymbol{U}}^T{\boldsymbol{I}}{\boldsymbol{U}} = {\boldsymbol{I}} = {\boldsymbol{V}}^T{\boldsymbol{I}}{\boldsymbol{V}}$ , we see this is a difference between using an identity metric ${\boldsymbol{I}}$ and a metric defined by the margins that are collected in ${\boldsymbol{D}}_{\boldsymbol{r}}$ and in ${\boldsymbol{D}}_{\boldsymbol{c}}$ . The influence of this metric used in CA is most clearly visible in the definition of the chi-squared distances (8), that makes that, for example, for row profiles $i$ and $i'$ , equally large differences between columns $j$ and $j'$ are weighted by the margins of $j$ and $j'$ in such a way that a column with a smaller margin takes a larger part in the chi-squared distance between $i$ and $i'$ .

5. Text categorization

LSA is widely used in text categorization (Zhang et al., Reference Zhang, Yoshida and Tang2011; Elghazel et al., Reference Elghazel, Aussem, Gharroudi and Saadaoui2016; Dzisevič and Šešok, Reference Dzisevič and Šešok2019; Phillips et al., Reference Phillips, Saleh, Glazewski, Hmelosilver, Lee, Mott and Lester2021). However, to our best knowledge, few papers on text categorization use CA, even though CA is similar to LSA. In this section, we compare the performance of LSA and CA in text categorization of three English datasets: BBCNews, BBCSport, and 20 Newsgroups. These datasets have recently been studied in the evaluation of text categorization, for example, Barman and Chowdhury (Reference Barman and Chowdhury2020).

5.1 Datasets and methods

The BBCNews dataset (Greene and Cunningham, Reference Greene and Cunningham2006) consists of 2225 documents that are divided into five categories: “Business” (510 documents), “Entertainment” (386), “Politics” (417), “Sport” (511), and “Technology” (401). The BBCSport dataset (Greene and Cunningham, Reference Greene and Cunningham2006) consists of 737 documents that are divided into five categories: “athletics” (101), “cricket” (124), “football” (265), “rugby” (147), and “tennis” (100). The 20 Newsgroups dataset, that is, the 20news-bydata version (Rennie, Reference Rennie2005), consists of 18,846 documents that are divided into 20 categories. The dataset is sorted into a training (60%) and a test set (40%). We use a subset of these documents. Specifically, we choose 2963 documents from three categories: “comp.graphics” (584 documents for training set and 389 documents for test set), “rec.sport.hockey” (600 and 399), and “sci.crypt” (595 and 396). The reason we choose a subset (three categories) of 20 Newsgroups is that we want to explore text categorization for datasets with a different but similar number of categories: six (for Wilhelmus dataset in Section 6), five (for BBCNews), four (for BBCSport), and three (for a subset of 20 Newsgroups).

To preprocess these datasets, we project all characters to lower case, remove punctuation marks, numbers, and stop words, and apply lemmatization. Subsequently, terms with frequencies lower than 10 are ignored. In addition, following Silge and Robinson (Reference Silge and Robinson2017), we remove unwanted parts of the 20 Newsgroups dataset such as headers (including fields like “From:” or “Reply-To:” that describe the message), because these are mostly irrelevant for text categorization.

We use two approaches to compare LSA and CA. One is visualization, where we use LSA and CA to visualize documents by projecting them onto two dimensions. The other is to use distance measures to quantitatively evaluate and compare performance in text categorization. We use four different methods based on Euclidean distance for measuring the distance from a document to a set of documents (Guthrie, Reference Guthrie2008; Koppel and Seidman, Reference Koppel and Seidman2013; Kestemont et al., Reference Kestemont, Stover, Koppel, Karsdorp and Daelemans2016). We choose the Euclidean distance because it plays a central role in the geometric interpretation of LSA and CA (see Sections 2 and 3).

  1. Centroid Euclidean distance between the document and the centroid of the set of documents. The centroid for a set of documents is calculated by averaging the coordinates across all these documents.

In the other three methods, we first calculate the Euclidean distance between the document and every document of the set of documents.

  1. Average average of these Euclidean distances.

  2. Single the minimum Euclidean distance among the Euclidean distances.

  3. Complete the maximum Euclidean distance among the Euclidean distances.

These four methods are similar to the procedures of measuring the distance between clusters in hierarchical clustering analysis, using the centroid, average, single, and complete linkage method, respectively (Jarman, Reference Jarman2020).

In line with the foregoing sections, we denote the raw document-term matrix by ${\boldsymbol{F}}$ . In the case of LSA, we examine four versions: LSA of ${\boldsymbol{F}}$ (LSA-RAW), LSA of the row-normalized matrices ${\boldsymbol{F}}^{L1}$ (LSA-NROWL1) and ${\boldsymbol{F}}^{L2}$ (LSA-NROWL2), and LSA of the TF-IDF matrix ${\boldsymbol{F}}^{\text{TF-IDF}}$ (LSA-TFIDF). In addition, we also compare performance with the raw document-term matrix, denoted as RAW, where no dimensionality reduction has taken place.

5.2 Visualization

The 2225 documents of the BBCNews dataset lead to a document-term matrix of size 2225 $\times$ 5050. Figure 3 shows the results of an analysis of this document-term matrix by the four LSA methods (LSA-RAW, LSA-NROWL1, LSA-NROWL2, and LSA-TFIDF) and CA. On this dataset, we find that, although the percentage of the total sum of squared singular values in the first two dimensions for CA is lower than the four LSA methods, the four LSA methods do not separate the classes well but CA does a reasonably good job. This is because the margins play an important role in the first two dimensions for the four LSA methods and the relations between documents are blurred by these margins.

Figure 3. The first two dimensions for each document of BBCNews dataset by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

The 737 documents of BBCSport dataset lead to a document-term matrix of size 737 $\times$ 2071. Figure 4 shows the results of an analysis of this document-term matrix. Again, we find that the LSA methods do not separate the classes well, but CA does a reasonably good job.

Figure 4. The first two dimensions for each document of BBCSport dataset by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

The 2963 documents of 20 Newsgroups dataset lead to a document-term matrix of size 2927 $\times$ 2834.Footnote a Figure 5 shows the results of an analysis of this document-term matrix. On this dataset, we find that CA is doing a reasonably good job, and so do LSA-NROWL1 and LSA-NROWL2.

Figure 5. The first two dimensions for each document of 20 Newsgroups dataset by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

Table 8. The minimum optimal dimensionality $k$ and the accuracy in $k$ for LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA, and the accuracy (Acc) for RAW using different distance measurement methods with the BBCNews, BBCSport, and 20 Newsgroups datasets

5.3 Distance measures

For the 20 Newsgroups dataset, there is a training and a test set, and we assess the accuracy as a measure for the correct classification of the documents of the test set. For the 20 Newsgroups dataset, there are four steps. First, we apply all four varieties of LSA and CA to all documents of the training set. The documents of the test set are projected into the reduced dimensional space; see Sections 2.2.4 and 3. Second, using the centroid, average, single, and complete method, for each document of the test set, the distance between the document and a set of documents for each of three categories (“comp.graphics,” “rec.sport.hockey,” and “sci.crypt”) in the training set is computed. The predicted category for the document is the category with the smallest distance. Third, we compare the predicted category with the true category of the document. Finally, the accuracy is the proportion of correct classifications of all documents of the test set. For BBCNews and BBCSport datasets, in order to evaluate LSA methods and CA, we use fivefold cross-validation (Gareth et al., Reference Gareth, Daniela, Trevor and Robert2021). That is, the dataset is randomly divided into five folds. The four folds (80% of the dataset) are used as training set, and the remaining one fold (20% of the dataset) is as validation set. The accuracy of each fold is obtained as in the 20 Newsgroups dataset. Then the accuracy is averaged across five folds.

For each form of LSA and for CA, there is an accuracy for each number of dimensions (for five-fold cross-validation, the accuracy is averaged across five folds). The maximum accuracy is the maximum value across these accuracies. Table 8 shows the maximum accuracy for LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA for the four distance measures,Footnote b along with the minimum optimal dimension $k$ where this maximum accuracy is reached.Footnote c First, if we ignore the complete distance method, considering that it has low accuracy overall, CA yields the maximum accuracy compared to the RAW method (i.e., without dimensionality reduction) as well as all four LSA methods for each combination of dataset and other distance measurement method, except for the BBCSport dataset with the average method, where CA has the second largest accuracy. Second, for each dataset, CA is doing best overall. Specifically, CA with the centroid, the single, and the centroid distance method provides the best accuracy for BBCNews, BBCSport, and 20 Newsgroups datasets, respectively.

In order to further explore different dimensionality reduction methods under optimal distance measurement method which provides highest accuracy, Figure 6 shows the accuracy as a function of the numbers of dimensions under centroid, single, and centroid methods for BBCNews, BBCSport, and 20 Newsgroups datasets, respectively. CA in combination with the optimal distance measurement method performs better than the other methods over a large range, especially for BBCNews dataset, almost irrespective of dimension.

Figure 6. Accuracy as a function of dimension for CA, LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and RAW.

6. Authorship attribution

In this section, we examine the performance of LSA and CA on a dataset originally set up for authorship attribution. We first use the dataset to see how well LSA and CA are able to assign documents with a known author to the correct author. Second, we assign a document with unknown author to one of the known authors.

Authorship attribution is the process of identifying the authorship of a document; its applications include plagiarism detection and resolving of authorship disputes (Bozkurt, Baghoglu, and Uyar, Reference Bozkurt, Baghoglu and Uyar2007) and are particularly relevant for historical texts, where other historical records are not sufficient to determine authorship. Both LSA and CA have been used for authorship attribution before. For example, Soboroff et al. (Reference Soboroff, Nicholas, Kukla and Ebert1997) applied LSA with n-grams as terms to visualize authorship among biblical Hebrew texts. McCarthy et al. (Reference McCarthy, Lewis, Dufty and McNamara2006) applied LSA to lexical features to automatically detect semantic similarities between words (Stamatatos, Reference Stamatatos2009). Satyam et al. (Reference Satyam, Dawn and Saha2014) used LSA on a character n-gram-based representation to build a similarity measure between a questioned document and known documents. Mealand (Reference Mealand1995) studied the Gospel of Luke using a visualization provided by CA. Mealand (Reference Mealand1997) also measured genre differences in Mark by CA. Mannion and Dixon (Reference Mannion and Dixon2004) applied CA to study authorship attribution of the case of Oliver Goldsmith by visualization.

The Wilhelmus is the national anthem of the Netherlands, and its authorship is unknown and much debated. There is a substantive amount of qualitative research attempting to determine the authorship of the Wilhelmus, with quantitative or statistical methods being used relatively recently. To the best of our knowledge, the authorship of the Wilhelmus was first studied by statistical methods and computational means in Winkel (Reference Winkel2015), whose results on authorship attribution were inconclusive. After that, Kestemont et al. (Reference Kestemont, Stronks, De Bruin and Winkel2017a, Reference Kestemont, Stronks, De Bruin and Winkel2017b) studied the question using PCA and the General Imposters (GI) method, attributing the Wilhelmus to the writer Datheen. Vargas Quiros (Reference Vargas Quiros2017) used the data of Kestemont et al. (Reference Kestemont, Stronks, De Bruin and Winkel2017a, Reference Kestemont, Stronks, De Bruin and Winkel2017b) and applied the KRIMP compression algorithm (Van Leeuwen, Vreeken, and Siebes, Reference Van Leeuwen, Vreeken and Siebes2006) and Kullback–Leibler Divergence—they tended to agree with Kestemont et al. (Reference Kestemont, Stronks, De Bruin and Winkel2017a, Reference Kestemont, Stronks, De Bruin and Winkel2017b), even though the KRIMP attributed the Wilhelmus to another author when a different feature selection method was used. Thus, the results were inconclusive, with a tendency to prefer Datheen. Our paper provides further evidence in favor of attributing the authorship to Datheen.

6.1 Data and methods

We use a total of 186 documents by 6 writers, consisting of 35 documents written by Datheen, 46 by Marnix, 23 by Heere, 35 by Haecht, 33 by Fruytiers, and 14 by Coornhert. These documents contain tag-lemma pairs as terms, obtained through part-of-speech tagging and lemmatizing of the texts, and are made publicly available by Kestemont et al. (Reference Kestemont, Stover, Koppel, Karsdorp and Daelemans2016, Reference Kestemont, Stronks, De Bruin and Winkel2017a, Reference Kestemont, Stronks, De Bruin and Winkel2017b). The average marginal frequencies range from 406 for documents by Fruytiers to 545 for documents by Haecht. See Kestemont (Reference Kestemont2017) for more details regarding the dataset. Similar to Section 5, in this section, we also use visualization and distance measures to compare LSA and CA.

6.2 Visualization

We first examine all documents of two authors Marnix and Datheen,Footnote d using the 300 most frequent tag-lemma pairs. These form a document-term matrix of size $81 \times 300$ . Figure 7 shows the results of analyzing this document-term matrix using the four LSA methods (LSA-RAW, LSA-NROWL1, LSA-NROWL2, and LSA-TFIDF), and CA. The Wilhelmus document is not included in the data matrix, but it is projected into the solutions for illustrative purposes by W, in red; see Sections 2.2.4 and 3. As seen in Figure 7, all four varieties of LSA fail to show a clear separation, while CA separates documents by the two authors clearly, even though the first two dimensions for CA account for a much smaller percentage of the total sum of squared singular values than the first two dimensions for the four LSA methods. This is because the margins play an important role in the first two dimensions for the four LSA methods and the relations between documents are blurred by these margins. We also see that in CA the Wilhelmus is clearly attributed to Datheen.

Figure 7. The first two dimensions for each document of author Datheen and author Marnix, and the Wilhelmus (in red) by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

Given the effectiveness of CA and the attribution of the Wilhelmus to Datheen in the above analysis, we now show visualizations of CA for documents by Datheen and four other authors in turn (Figure 8). For three out of four authors, there is a clear separation between that author and Datheen. In the case Haecht however (sub-figure (b)), there is no clear separation from Datheen. In all three cases where there is a clear separation, Wilhelmus is attributed to Datheen, as before.

Figure 8. The first two dimensions for each document of author Datheen and another author, and the Wilhelmus (in red) using CA: (a) Heere; (b) Haecht; (c) Fruytiers; and (d) Coornhert.

Finally, we apply all four varieties of LSA and CA to all documents of the six authors, which form a document-term matrix of size $186 \times 300$ . Figure 9 shows the results of the analysis of this matrix by LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA. The Wilhelmus is projected into the solutions afterward. Again we find that, although the percentage of the total sum of squared singular values in the first two dimensions for CA is lower than the four LSA methods, CA separates the documents quite well compared with the four LSA methods. For instance, documents written by Marnix are effectively separated from the documents written by other authors. The documents of the other authors also seem to form much more distinguishable clusters, as compared to LSA, except for Datheen and Haecht.

Figure 9. The first two dimensions for each document of six authors, and the Wilhelmus (in red) by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

6.3 Distance measures

To evaluate LSA methods and CA, we use leave-one-out cross-validation (LOOCV) (Gareth et al., Reference Gareth, Daniela, Trevor and Robert2021) with the 186 documents of 6 authors. Using LOOCV, each time we discern the following four steps. At the first step, a single document of the 186 documents is used as the validation set and the remaining 185 documents make up the training set. The 185 documents of training set form a document-term matrix with 185 rows and 300 columns. At step two, we perform LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA on this document-term matrix to obtain the coordinates of the 185 documents. The single document of validation set is projected into the solutions, see Sections 2.2.4 and 3. At step three, using the centroid, average, single, and complete method, the distance is computed between the single document and the six author groups of documents. For this single document, the predicted author of the document is the author with the smallest distance. At the final step, we compare the predicted author with the true author of the single document. We repeat this 186 times, once for each single document. The accuracy is calculated by the ratio: number of times an author is correctly predicted divided by 186.

Table 9 shows the maximum accuracy for LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA for the four distance measures,Footnote e along with the minimum optimal dimension $k$ . First, CA yields the maximum accuracy for all distance measurement methods as compared to the RAW method as well as all four LSA methods. Second, CA with the centroid method provides the highest accuracy.

Table 9. The minimum optimal dimensionality $k$ and the accuracy in $k$ for LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA, and the accuracy for RAW using different distance measurement methods with Wilhelmus dataset

In order to further explore the centroid method, Figure 10 shows the accuracy with different numbers of dimensions for LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA. Figure 10a displays all dimensions on the horizontal axis, and Figure 10b focuses on the first 10 dimensions. CA in combination with the centroid method performs better than the other methods almost irrespective of dimension, except for the very first ones. Also, the accuracy of CA in combination with the centroid method is very high over a large range.

Figure 10. Accuracy versus the number of dimensions (centroid method) for CA, RAW, LSA-RAW, LSA-NROWL1, LSA-NROWL2, and LSA-TFIDF with Wilhelmus dataset.

6.4 Authorship attribution of the Wilhelmus

Since CA in combination with the centroid method appears to be the best overall, we use them to determine the authorship of the Wilhelmus. In the 34 optimal dimensions (dimensions 151–184), we find that the Wilhelmus is attributed to the author Datheen, while Haecht is the second most likely candidate. The distance of the Wilhelmus to the centroid of documents of Datheen averaged across 34 optimal dimensions is 0.825, to Haecht 0.880, to Marnix 0.939, to Heere 1.015, to Fruytiers 1.064, and to Coornhert 1.253. Thus, CA attributes Wilhelmus to Datheen and provides more weight using an independent statistical technique, to prior results by Kestemont et al. (Reference Kestemont, Stronks, De Bruin and Winkel2017a, Reference Kestemont, Stronks, De Bruin and Winkel2017b) in resolving this debate.

7. Conclusion

LSA and CA both allow for dimensionality reduction by the SVD of a matrix; however, the actual matrix analyzed by LSA and CA is different, and therefore LSA and CA capture different kinds of information. In LSA, we apply an SVD to ${\boldsymbol{F}}$ , or to a weighted ${\boldsymbol{F}}$ . In CA, an SVD is applied to the matrix ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ of standardized residuals. The elements in ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ display the departure from the margins, that is, departure from the expected frequencies under independence collected in ${\boldsymbol{E}}$ . Due to ${\boldsymbol{E}}$ , in CA the effect of the margins is eliminated—a solution only displays the dependence between documents and terms. Concluding, in LSA, the effect of the margins as well as the dependence is part of the matrix that is analyzed, and these margins usually play a dominant role in the first dimension of the LSA solution as usually on the first dimension all points depart in the same direction from the origin. On the other hand, in CA all points are scattered around the origin and the origin represents the profile of the row and column margins of ${\boldsymbol{F}}$ .

In summary, although LSA allows a study of the relations between documents, between terms, and between documents and terms, this study is not easy. The reason is that these relations are blurred by the effect of the margins that are also displayed in the LSA solution. CA does not have this property. Therefore, it appears that CA is a better tool for studying the relations between documents, between terms, and between documents and terms. Also, discussed in Section 3, CA has many nice properties like providing a geometric display where the Euclidean distances approximate the $\chi ^2$ -distances between the rows and between the columns of the matrix, and the relation to the Pearson $\chi ^2$ statistic. Overall, from a theoretical point of view, it appears that CA has more attractive properties than LSA. Empirically, we evaluated and compared the two methods on text categorization in English and authorship attribution in Dutch and found that CA can both separate documents better visually and obtain higher accuracies on text categorization and authorship attribution as compared to LSA techniques.

A document-term matrix is similar to a word-context matrix, commonly used to represent word meanings, in the sense that it is also a matrix of counts. However, in the context of word-context matrices the ways in which the counts are transformed are usually different from the way they are transformed for document-term matrices, and therefore, due to space limitations, we defer a comparison of CA and LSA of word-context matrices to future work. In the future, it is also interesting to compare word embeddings learned by LSA-based methods and CA to more recent static word embedding approaches such as Word2Vec and GloVe, or even contextualized word embeddings modes like BERT. And it is interesting to compare LSA-based methods and CA on recent classifiers, such as neural network models.

Acknowledgments

Author Qianqian Qi is supported by the China Scholarship Council.

Competing interests declaration

Author Qianqian Qi is supported by the China Scholarship Council. Author David J. Hessen, Author Tejaswini Deoskar, and Author Peter G. M. van der Heijden declare none.

Footnotes

a After preprocessing, 36 documents out of 2963 became empty documents and were removed.

b For BBCSport dataset, we explore the number of all dimensions of dimensionality reduction methods. For BBCNews and 20 Newsgroups datasets, we vary the number of dimension $k$ from 1 to 450.

c There is not one single optimal number of dimensions that provides the maximum accuracy; for reasons of space, we show only the lowest in Tables 8 and 9.

d We chose these two authors specifically, out of our dataset, as they are the two main contenders for the authorship of Wilhelmus—Marnix has been the most popular candidate from qualitative analysis, and since the work of Kestemont et al., (Reference Kestemont, Stronks, De Bruin and Winkel2017a, Reference Kestemont, Stronks, De Bruin and Winkel2017b) Datheen is also a serious candidate.

e For Wilhelmus dataset, we explore the number of all dimensions of dimensionality reduction methods.

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Figure 0

Table 1. A document-term matrix ${\boldsymbol{F}}$: size 6$\times$6

Figure 1

Table 2. The singular values, the squares of singular values, and the proportion of explained total sum of squared singular values (PSSSV) for each dimension of LSA of ${\boldsymbol{F}}$, of ${\boldsymbol{F}}^{L1}$, of ${\boldsymbol{F}}^{L2}$, and of ${\boldsymbol{F}}^{\text{TF-IDF}}$

Figure 2

Figure 1. A two-dimensional plot of documents and terms (a) for raw matrix ${\boldsymbol{F}}$; (b) for row-normalized data ${\boldsymbol{F}}^{L1}$; (c) for row-normalized data ${\boldsymbol{F}}^{L2}$; and (d) for matrix ${\boldsymbol{F}}^{\text{TF-IDF}}$.

Figure 3

Table 3. Row profiles of ${\boldsymbol{F}}$

Figure 4

Table 4. A row-normalized document-term matrix ${\boldsymbol{F}}^{L2}$

Figure 5

Table 5. A document-term matrix ${\boldsymbol{F}}^{\text{TF-IDF}}$

Figure 6

Table 6. The matrix ${\boldsymbol{D}}_r^{-\frac{1}{2}}({\boldsymbol{P}}-{\boldsymbol{E}}){\boldsymbol{D}}_{c}^{-\frac{1}{2}}$ of standardized residuals

Figure 7

Table 7. The singular values, the inertia, and the proportions of explained total inertia for each dimension of CA

Figure 8

Figure 2. The data of Table 1 using CA for (a) symmetric map and (b) asymmetric map.

Figure 9

Figure 3. The first two dimensions for each document of BBCNews dataset by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

Figure 10

Figure 4. The first two dimensions for each document of BBCSport dataset by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

Figure 11

Figure 5. The first two dimensions for each document of 20 Newsgroups dataset by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

Figure 12

Table 8. The minimum optimal dimensionality $k$ and the accuracy in $k$ for LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA, and the accuracy (Acc) for RAW using different distance measurement methods with the BBCNews, BBCSport, and 20 Newsgroups datasets

Figure 13

Figure 6. Accuracy as a function of dimension for CA, LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and RAW.

Figure 14

Figure 7. The first two dimensions for each document of author Datheen and author Marnix, and the Wilhelmus (in red) by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

Figure 15

Figure 8. The first two dimensions for each document of author Datheen and another author, and the Wilhelmus (in red) using CA: (a) Heere; (b) Haecht; (c) Fruytiers; and (d) Coornhert.

Figure 16

Figure 9. The first two dimensions for each document of six authors, and the Wilhelmus (in red) by (a) LSA-RAW; (b) LSA-NROWL1; (c) LSA-NROWL2; (d) LSA-TFIDF; and (e) CA.

Figure 17

Table 9. The minimum optimal dimensionality $k$ and the accuracy in $k$ for LSA-RAW, LSA-NROWL1, LSA-NROWL2, LSA-TFIDF, and CA, and the accuracy for RAW using different distance measurement methods with Wilhelmus dataset

Figure 18

Figure 10. Accuracy versus the number of dimensions (centroid method) for CA, RAW, LSA-RAW, LSA-NROWL1, LSA-NROWL2, and LSA-TFIDF with Wilhelmus dataset.