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A Refinement of Chronological Seriation Using Nonmetric Multidimensional Scaling

Published online by Cambridge University Press:  20 January 2017

Abstract

A method of chronological seriation and a system of collecting data for it were devised to cope with certain practical and theoretical inadequacies of other methods. The method and collecting system are described in the context of solving problems encountered in the course of a particular archaeological study. It is believed that the method described here will be of use to others. Finally, some implications of this kind of seriation for the way in which ceramics change are discussed.

Type
Articles
Copyright
Copyright © The Society for American Archaeology 1976

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References

Brainerd, George W. 1951 The place of chronological ordering in archaeological analysis. American Antiquity 16:301–13.Google Scholar
Caso, Alfonso, Bernal, Ignacio, and Acosta, Jorge R. 1967 La cerámica de Monte Albán. Instituto Nacional de Antropología e Historia, Memorias 13.Google Scholar
Cowgill, George L. 1972 Models, methods, and techniques for sedation. In Models in archaeology, edited by Clarke, David L., pp. 381424. Methuen, London.Google Scholar
Craytor, William Bert, and Johnson, LeRoy Jr., 1968 Refinements in computerized item seriation. University of Oregon Museum of Natural History, Bulletin 10. Google Scholar
Drennan, Robert D. 1976 Fábrica San José and Middle Formative society in the Valley of Oaxaca, Mexico. University of Michigan Museum of Anthropology Memoirs. (In press, ms. 1975.)CrossRefGoogle Scholar
Flannery, Kent V. 1968 The Olmec and the Valley of Oaxaca: a model of inter-regional interaction in Formative times. In Dumbarton Oaks Conference on the Olmec, edited by Benson, Elizabeth P., pp. 79110. Dumbarton Oaks, Washington, DC.Google Scholar
Guttman, Louis 1968 A general nonmetric technique for finding the smallest coordinate space for a configuration of points. Psychometrika 33:469506.Google Scholar
Hole, Frank, and Shaw, Mary 1967 Computer analysis of chronological seriation. Rice University Studies 53(3).Google Scholar
Johnson, LeRoy Jr., 1972 Introduction to imaginary models for archaeological scaling and clustering. In Models in archaeology, edited by Clarke, David L., pp. 309–80. Methuen, London.Google Scholar
Kendall, D. G. 1971 Seriation from abundance matrices. In Mathematics in the Archaeological and historical sciences, edited by Hodson, F. R., Kendall, D. G., and Tautu, P., pp. 215–52. Edinburgh University Press, Edinburgh.Google Scholar
Blalock, Hubert M. Jr., 1964a Multidimensional scaling by optimizing goodness of fit to a nonmetric hypothesis. Psychometrika 29:127.Google Scholar
Blalock, Hubert M. Jr., 1964b Nonmetric multidimensional scaling: a numerical method. Psychometrika 29:115–29.Google Scholar
Kruskal, J.B. 1971 Multidimensional scaling in archaeology: time is not the only dimension. In Mathematics in the archaeological and historical sciences, edited by Hodson, F. R., Kendall, D. G., and Tautu, P., pp. 119–32. Edinburgh University Press, Edinburgh.Google Scholar
Kuzara, Richard S., Mead, George R., and Dixon, Keith A. 1966 Seriation of anthropological data: a computer program for matrix-ordering. American Anthropologist 68:1442–55.CrossRefGoogle Scholar
LeBlanc, Stephen A. 1975 Micro-seriation: a method for fine chronologic differentiation. American Antiquity 40:2238.CrossRefGoogle Scholar
Lingoes, James C. 1970 A general nonmetric model for representing objects and attributes in a joint metric space. In Archéologie et calculateurs: problèmes sémiologiques et mathematiques. Editions du Centre National de la Recherche Scientifique, Paris.Google Scholar
Lingoes, James C. 1972 A general survey of the Guttman-Lingoes nonmetric program series. In Multidimensional scaling: theory and applications in the behavioral sciences, Vol. I: Theory, edited by Shepard, Roger N., Kimball Romney, A., and Nerlove, Sara Beth. Seminar Press, New York.Google Scholar
Lingoes, James C. 1973 The Guttman-Lingoes nonmetric program series. Mathesis Press, Ann Arbor, MI.Google Scholar
Lingoes, James C. n.d. A Fortran IV program generalizing the Schönemann-Carroll matrix fitting algorithm to monotone and linear fitting of configurations. University of Michigan Computing Center. Mimeographed.Google Scholar
Phillips, Philip, Ford, James A., and Griffin, James B. 1951 Archaeological survey in the lower Mississippi alluvial valley. 1940-1947. Peabody Museum of American Archaeology and Ethnology, Harvard University, Papers 25.Google Scholar
Robinson, W. S. 1951 A method for chronologically ordering archaeological deposits. American Antiquity 16:293301.CrossRefGoogle Scholar
Rouse, Irving 1960 The classification of artifacts in archaeology. American Antiquity 25:313–23.Google Scholar
Shepard, Roger N. 1962 The analysis of proximities: multidimensional scaling with an unknown distance function. Psychometrika 27:125–40 and 219-46.Google Scholar
Shepard, Roger N. 1972 Introduction to Volume I. In Multidimensional scaling: theory and applications in the behavioral sciences, Vol. I: Theory, edited by Shepard, Roger N., Kimball Romney, A., and Nerlove, Sara Beth. Seminar Press, New York.Google Scholar
Shepard, Roger N., Kimball Romney, A., and Nerlove, Sara Beth (Editors) 1972 Multidimensional scaling: theory and applications in the behavioral sciences, Vol. I: Theory. Seminar Press, New York.Google Scholar