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Testing the accuracy ratio of the Spatio-Temporal Epidemiological Modeler (STEM) through Ebola haemorrhagic fever outbreaks

Published online by Cambridge University Press:  01 December 2015

F. BALDASSI
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy
F. D'AMICO
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy
M. CARESTIA
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Department Industrial Engineering, University of Rome Tor Vergata, Italy
O. CENCIARELLI
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy
S. MANCINELLI
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Department of Biomedicine and Prevention, School of Medicine and Surgery, University of Rome Tor Vergata, Italy
F. GILARDI
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Department of Biomedicine and Prevention, School of Medicine and Surgery, University of Rome Tor Vergata, Italy
A. MALIZIA*
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Department Industrial Engineering, University of Rome Tor Vergata, Italy
D. DI GIOVANNI
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Department Industrial Engineering, University of Rome Tor Vergata, Italy
P. M. SOAVE
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Università Cattolica del Sacro Cuore, School of Medicine and Surgery, Rome, Italy
C. BELLECCI
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Department Industrial Engineering, University of Rome Tor Vergata, Italy
P. GAUDIO
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Department Industrial Engineering, University of Rome Tor Vergata, Italy
L. PALOMBI
Affiliation:
International Master Courses in Protection Against CBRNe events, Department of Industrial Engineering and School of Medicine and Surgery, University of Rome Tor Vergata, Italy Department of Biomedicine and Prevention, School of Medicine and Surgery, University of Rome Tor Vergata, Italy
*
*Author for correspondence: Dr A. Malizia, Department Industrial Engineering, University of Rome Tor Vergata, Italy. (Email: [email protected])
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Summary

Mathematical modelling is an important tool for understanding the dynamics of the spread of infectious diseases, which could be the result of a natural outbreak or of the intentional release of pathogenic biological agents. Decision makers and policymakers responsible for strategies to contain disease, prevent epidemics and fight possible bioterrorism attacks, need accurate computational tools, based on mathematical modelling, for preventing or even managing these complex situations. In this article, we tested the validity, and demonstrate the reliability, of an open-source software, the Spatio-Temporal Epidemiological Modeler (STEM), designed to help scientists and public health officials to evaluate and create models of emerging infectious diseases, analysing three real cases of Ebola haemorrhagic fever (EHF) outbreaks: Uganda (2000), Gabon (2001) and Guinea (2014). We discuss the cases analysed through the simulation results obtained with STEM in order to demonstrate the capability of this software in helping decision makers plan interventions in case of biological emergencies.

Type
Original Papers
Copyright
Copyright © Cambridge University Press 2015 

INTRODUCTION

Mathematical modelling has emerged as an important tool for gaining understanding of the dynamics of the spread of infectious diseases. The need for accurate models which describe the epidemic process are vital, as infectious disease outbreaks threaten national and international stability with their potential impact, especially on public health and the economy. Scientific literature proposes mathematical models for studying epidemics, outbreaks, and optimization of interventions [Reference Bachinsky and Nizolenko1]. These mathematical tools are extremely valuable also for risk analysis, although sometimes challenging to apply and decipher for non-specifically trained users. For this reason, the development of user-friendly software for the easy application and visualization of epidemic models is of great interest in the field of risk assessment and emergency management.

Infectious diseases have always been of great concern for humanity. The struggle with these agents appears to know no bounds, and the strong belief, diffused after the 1960s, that infectious diseases would be eradicated with the improvement in sanitation, antibiotics, vaccinations, medical science and medical care, is now wavering. The World Health Organization (WHO) states that infectious diseases are responsible for the death of over 17 million people a year [2] and billions of others are infected. Furthermore, infectious diseases are still among the major causes of mortality in developing countries [3]. The main causes for this situation is that the aetiological agents causing infectious diseases are able to adapt and evolve, therefore we can observe new emerging infectious diseases [Reference Morse4]; at present, bacteria which are able to swim in pure bleach or survive in a dose of penicillin are known. Moreover, some diseases which were believed to be eradicated, are re-emerging, sometimes after hundreds of years and/or even in a more virulent form [Reference Morens, Folkers and Fauci5].

Together with the threat of biological weapons, whose research is lately focused on microorganisms and lethal infectious diseases, we have great motivation to understand how infectious diseases spread in the population and, eventually, improve the countermeasures to control their diffusion. Mathematical epidemiology contributes to the understanding of the behaviour of infectious diseases, and allows predictions about their spread in the population. Detection, prevention, therapy and control programmes, all take advantage of mathematical modelling for their comparison, evaluation, optimization and implementation.

In order to prevent, or at least to reduce an epidemic outbreak (or to minimize an infection from spreading), there is the need of models that can accurately capture the main characteristics of the disease; in fact, being able to foresee disease propagation is vital to provide more effective response measures. These will be reliable only if model parameters are well estimated.

Epidemic modelling has three main aims. The first is to understand the spreading mechanism of the disease. For this, the essential part is a mathematical structure (equations give us threshold values and other constants which we use to describe the behaviour of the disease). The second aim is to predict the future course of the epidemic. The third is to understand how we may control the spread of the epidemic (education, immunization, isolation, and more, analysis of the international protocols to contain epidemics and pandemic events based on evidence). In order to make a reliable model and predictions to develop methods of control, we must be sure that our model describes the epidemic closely, i.e. it contains all its specific features. Therefore, it is important to validate models by investigating whether they fit the observed data.

In this article, we used the Spatio-Temporal Epidemiological Modeler [STEM (Eclipse Foundation; http://www.eclipse.org], a tool designed to help scientists and public health officials to create and use models of emerging infectious diseases. STEM uses mathematical models of diseases (based on differential equations) to simulate the development or space–time evolution of a disease. In particular, our challenge is to demonstrate the reliability of this tool by analysing three real cases of Ebola haemorrhagic fever (EHF) outbreaks: Uganda (2000) [Reference Okware6, 7], Gabon (2001) [8], and Guinea (2014) [Reference Baize9Reference Cenciarelli11].

In particular, our approach consisted of an initial assessment of the validity of the software through a benchmark between simulations and epidemiological data from the past Uganda EHF outbreak (2000, SEBOV strain). Next, we applied the epidemiological data from another well known EHF outbreak (Zaire 1995, ZEBOV strain), and we further evaluated the software as tool to simulate the development and evolution of two real EHF outbreak, Gabon (2001) and the recent Guinea outbreak (2014). These two EHF outbreaks were due to ZEBOV strain.

METHODS

STEM

STEM software is Java-based, and is an open-source software project under the umbrella of the Eclipse foundation [12]. STEM allows users to create spatial and temporal models of emerging infectious diseases. It was designed to help developers, researchers and users to plug in their choice of models. It comes with a large number of existing compartment models, e.g. Susceptible/Infectious (SI), Susceptible/Infectious/Recovered (SIR) and Susceptible/Exposed/Infectious/Recovered (SEIR) models pre-coded with both deterministic and stochastic engines, and a new model-building framework that allows users to rapidly extend existing models or to create entirely new models. These models could aid in understanding, and potentially preventing, the spread of a disease.

The STEM application has built-in Geographical Information System (GIS) data for almost every country in the world. It comes with data about country borders, populations, shared borders (neighbours), interstate highways, state highways, and airports. This data come from various public sources.

STEM treats the world as a graph within a modular and hierarchical modelling structure. From bottom to top, this structure has three basic levels: graphs, models, and scenarios. We refer to STEM tutorial (https://wiki.eclipse.org/Tutorials_for_Developers) for in-depth examination of all the software functions.

SEIR epidemic model

Among different mathematical epidemic models [Reference Bachinsky and Nizolenko1, 12Reference Ndanguza, Tchuenche and Haario14], we fitted the data from Uganda (2000), Gabon (2001) and Guinea (2014) EHF outbreaks in a simple deterministic (continuous time) SEIR epidemic model [Reference Hethcote15]. Almost all existing literature [Reference Chowell16Reference Lekone and Finkenstädt18] on Ebola epidemic prediction are based on this model.

Individuals can be part of one of the following epidemiological states:

Susceptible (S): healthy population at risk of contract ing the disease.

Exposed (E): infected, but not yet infectious.

Infectious (I): infected and infecting others; capable of transmitting the disease.

Removed or Recovered (R): population that dies or recovers from the disease.

We assume the population is closed, that is, the effect of demographic changes (birth and natural death) is minimal during the course of the epidemic. The total population size N is divided in four compartments: susceptible individuals at time t, S(t), the exposed class E(t) with an average incubation period of 1/ε days before progressing to the infectious class I(t), and the removed [death D(t) or recovered R(t)] class R(t) (where without any ambiguity of notation, R will henceforth be referred to as recovered class). Infectious individuals move to the R class (death or recovered) at the per capita rate 1/γ. In the absence of treatment, the R class is termed removed because individuals reaching it will never have the chance to rejoin the process [Reference Ndanguza, Tchuenche and Haario14, Reference Lekone and Finkenstädt18]. The model flowchart is depicted in Figure 1.

Fig. 1. SEIR compartment model. Epidemiological states: S, susceptible (healthy population at risk of contracting the disease); E, exposed (infected, but not yet infectious); I, infectious (infected and infecting others, capable of transmitting the disease); R, removed or recovered (population that dies or recovers from the disease); C, is not a compartment (includes I and R); β, transmission rate; ε, incubation rate (per unit time); γ, recovery rate (per unit time); 1/γ, average recovery period; μ*, population birth rate; μ, population death rate; α, immunity loss rate.

C(t) is not a compartment, but is needed to keep track of the cumulative number of Ebola cases from the onset of symptoms. C(t) is not an epidemiological parameter, it is the sum of I and R, thereby including all suspected and confirmed cases.

The epidemiological states and epidemiological features present in the SEIR compartment model are reported in Table 1.

Table 1. Epidemiological states and epidemiological features present in the SEIR compartment model. Explanation in extenso are reported in the text

Differential equation model

The above transmission process is modelled by the following system of nonlinear ordinary differential equations [12, Reference Lavine, Poss and Grenfell13]:

(1) $$\displaystyle{{{\rm dS}(t)} \over {{\rm d}t}} = \,-\beta S\left( t \right)I\left( t \right)/N,$$
(2) $$\displaystyle{{{\rm d}E(t)} \over {{\rm d}t}} = \,-\beta S\left( t \right)I\left( t \right)/N - \varepsilon E(t),$$
(3) $$\displaystyle{{{\rm d}I(t)} \over {{\rm d}t}} = \,\varepsilon E(t) - \gamma I(t),$$
(4) $$\displaystyle{{{\rm d}R(t)} \over {{\rm d}t}} = \gamma I(t).$$

This model takes into consideration the number of people infected due to direct contact with an infected individual and the number of people infected due to indirect contact: –βS(t)I(t)/N. The individuals exhibit the symptoms of the disease and move on to the infectious stage. This is denoted by εE, where ε is the per capita infectious rate. Then 1/ε becomes the average time for a latent individual to become infectious. This will be denoted by γI, where γ is the per capita death rate. Then, 1/γ becomes the average time it takes an individual to die once he/she has entered the infectious stage. As before, the number of dead and recovered individuals is assumed to be the same, since there has not been a case in which a person who survived Ebola contracts the disease again [Reference Ndanguza, Tchuenche and Haario14].

Outbreak data

The Ebola virus is a member of the family Filoviridae. The viruses in the family, called Filoviruses, cause severe haemorrhagic fever in humans and primates. Haemorrhagic fever is characterized by high fever, internal bleeding, hypotension and shock. There are five known strains of Ebola virus, each named according to the location where it was first recognized. These five strains are Ebola-Zaire (ZEBOV), Ebola-Sudan (SEBOV), Ebola-Ivory Coast (CIEBOV), Ebola-Bundibugyo (BEBOV) and Ebola-Reston (REBOV) [Reference Sanchez, Knipe and Howley19, Reference Cenciarelli20].

The virus is spread through close contact and contaminated medical equipment. When a person comes into contact with, and becomes infected by the Ebola virus, the incubation period is 2–21 days (average 8–10 days). The onset of the illness is then abrupt and includes fever, headache, joint and muscle aches, sore throat and weakness, followed by diarrhoea, vomiting and stomach pain. This condition is called haemorrhagic fever and it is often fatal [Reference Sanchez, Knipe and Howley19, 21]. We analysed data from the three aforementioned EHF epidemics. A brief description of the outbreaks is given in the next sections.

Uganda (2000)

A total of 425 cases (case fatality rate 53%) of Ebola were identified in three districts of Uganda: Gulu, Masindi and Mbara [22Reference Francesconi25]. The onset of symptoms of the first reported case was on 30 August, but the cause was not identified as Ebola until 15 October by the National Institute of Virology in Johannesburg (South Africa).

Most of the 425 presumptive cases (confirmed and clinically diagnosed) occurred in the district of Gulu (470 000 inhabitants [Reference Okware6]). For this reason, we fitted our model with Gulu district data.

Gabon (2001)

The first index case was probably infected during a hunt near Mendemba village, on 21 October 2001, and the last index case was infected near Grand Itoumbi village on 23 February 2002. During this epidemic, most secondary cases were related to community-based transmission. All cases observed in the Ivindo district were linked to two imported cases from La Zadié, which were admitted to Makokou Regional Hospital. Two healthcare workers were infected: one in Mékambo Health Centre (La Zadié district, Gabon), and one in Makokou Regional Hospital (Ivindo district, Gabon) [8].

Guinea (2014)

On 23 March 2014, the WHO issued its first public announcement on a new outbreak of Ebola virus disease, which began in December 2013 in the Republic of Guinea [Reference Baize9Reference Cenciarelli11, 26]. The initial source of the outbreak appears to be the village of Meliandou in Gueckedou Prefecture, and the index case was a 2-year-old child who died on 6 December 2013. From the start of the outbreak to 22 March 2014, a total of 49 cases including 29 deaths (case fatality ratio 59%) were reported [Reference Baize9, Reference Gatherer10, Reference Cenciarelli11, 26].

Epidemiological features of the three EHF outbreaks

See Table 2 for epidemiological features of the three EHF outbreaks.

Table 2. Epidemiological features of three EHF outbreaks

a Standard STEM population (2006).

b Infectious mortality rate (δ): shown only in the STEM compartment SEIR model.

d UN data – A world of information: Guinea (https://data.un.org/CountryProfile.aspx?crName=GUINEA).

Assumptions

To run the simulations, we made the following assumptions for the epidemics:

  1. (1) The entire population was initially considered susceptible, and as a result, at the beginning of the epidemic N(t) = S(t).

  2. (2) The population considered is a constant population during the simulation of all outbreaks. This means that there are no deaths due to outside factors and the number of births that occurred are so small that we overlook them. As a result, we can safely ignore the μ* and μ parameters.

  3. (3) For each outbreak simulation the SEIR epidemic model was respectively initialized with the number of index cases indicated in Table 2 (see ‘Number of index cases’).

  4. (4) All observed EHF cases (deaths and suspected cases) were assumed to be related to human-to-human transmission.

  5. (5) For each outbreak the period of time evaluated, indicated in Table 2 as ‘Period considered’, go from the onset of outbreak to the initial control interventions (hospitalization, disease control measures, quarantine, etc.). In this way we can study the real distribution of the outbreak, without external interventions.

  6. (6) The suspected cases (C) are the combination of I and R(D) individuals.

  7. (7) To simulate the Uganda outbreak we assumed that the index cases were distributed uniformly in all Gulu districts; this is because the literature from where we obtain the epidemiological data of the EHF Uganda outbreak [Reference Chowell16] does not detail the real geographical distribution of these index cases.

  8. (8) For simulating Gabon and Guinea outbreaks we used the epidemiological data of the Congo outbreak (1995). This allows evaluation of the software as tool for simulating the development and evolution of two real EHF outbreak using the epidemiological data from another EHF outbreak, but caused by the same strain (ZEBOV).

RESULTS

We use the parameters in Table 2 to simulate the EHF outbreaks in Uganda (2000), Gabon (2001) and Guinea (2014) through STEM software.

According to the reference literature from WHO [28], the EHF outbreak in Uganda in 2000, produced 71 suspected cases including 35 deaths in Gulu district, northern Uganda in the reference period between 18 September and 16 October in 2000. We fit the epidemiological features in Table 2 in STEM and the results of the simulation are given in Figure 2 and Table 3.

Fig. 2. Results of STEM simulation of the Uganda scenario. (a) Map view of the geographical distribution of the disease deaths; in particular, in the square with a red border the main information is reported: i.e. the name of the region considered, the area extension in km2 and the coordinates of the region, the population numbers before the disease occurred, the population numbers after the period considered that the disease occurred and the end time of the period considered. (b) Disease deaths, (D)t. (c) Infected people, (I)t. (d) Recovered people, (R)t. Time in days.

Table 3. Results of the three EHF outbreaks simulation. Real and simulated data are reported together with a percentage estimation of the accuracy

In the EHF outbreak in Gabon (2001), according to the WHO [29], in the considered period of 25 October–16 December 2001, the Gabon Ministry of Health had reported 15 suspected cases (two laboratory confirmed) including 12 deaths in Ogooué Ivindo province in the northeastern part of the country. The simulated data obtained with STEM for this scenario are reported in Figure 3 and Table 3.

Fig. 3. Results of STEM simulation of the Gabon scenario. (a) Map view of the geographical distribution of the disease deaths; in particular, in the square with the red border the main information is reported: i.e. the name of the region considered, the area extension in km2 and the coordinates of the region, the population numbers before the disease occurred, the population numbers after the period considered that the disease occurred and the end time of the period considered. (b) Disease deaths, (D)t. (c) Infected people, (I)t. (d) Recovered people, (R)t. Time in weeks.

Finally, in the last EHF outbreak and according to WHO reports [26], in the considered period of 1 December 2013–22 March 2014, the Ministry of Health (MoH) of Guinea had notified a total of 49 cases including 29 deaths in Guekedou, Macenta, Nzerekore and Kissidougou districts in the east part of the country. We fit the epidemiological features in STEM software and the results of the simulation are indicated in Figure 4 and Table 3.

Fig. 4. Results of STEM simulation of the Guinea scenario. (a) Map view of the geographical distribution of the disease deaths; in particular, in the square with the red border the main information is reported: the name of the region considered, the area extension in km2 and the coordinates of the region, the population numbers before the disease occurred, the population numbers after the period considered that the disease occurred and the end time of the period considered. (b) Disease deaths, (D)t. (c) Infected people, (I)t. (d) Recovered people, (R)t. Time in weeks.

DISCUSSION

We simulated three different Ebola outbreaks using STEM and the results showed an elevated accuracy within the real and simulated data. This means that the SEIR compartmental model and STEM software could explain the epidemiological dynamics of Ebola virus (ZEBOV and SEBOV). Nevertheless, simplifying assumptions of the model implies that the results of this study need to be interpreted with caution.

In the EHF Uganda outbreak simulation the results obtained with STEM matched >90% with the real data and this outcome gives us the reasonable certainty that it can represent the epidemiological data obtained from the literature.

Other significant data come from the study performed with the epidemiological features of the EHF Zaire outbreak (1995) applied to the Gabon and Guinea EHF epidemics caused by the same strain of Ebola virus (ZEBOV). We arrange the epidemiological data from the Zaire outbreak in order to understand the behaviour of the disease in the cases of Gabon and Guinea. As can be seen in Table 3, the results are significant and considerable. In fact, the simulated data match the case of the Gabon outbreak by >91% and match the recent case of Guinea by 87–100%. However, in the last Ebola case we emphasize that the full-length genome sequencing and phylogenetic analysis showed that the ZEBOV from Guinea forms a separate clade in relation to the known EBOV strains from the Zaire and Gabon outbreaks.

Overall, STEM software overestimates the real data, with few exceptions. In this regard, it should be emphasized that the period considered in the STEM simulations referred only to the onset of the disease until the initial interventions. We decided to proceed in this way in order to understand if STEM could characterize the natural distribution of the outbreak without external interventions, such as medical countermeasures or quarantine.

CONCLUSIONS

The outcomes of this study suggest that if the epidemiological features of a specific contagious disease are already known, STEM software could be a useful tool for understanding, with a high level of accuracy, how the outbreak will spread. As a result, this open-source software could became, with some limitations, an additional powerful weapon to evaluate the dynamics of the spread of infectious diseases whether they are the result of a natural epidemic or non-conventional human activities.

ACKNOWLEDGMENTS

The authors thank the International Master Courses in Protection Against CBRNe events for support both technically and economically in the realization of this work (www.mastercbrn.com).

DECLARATION OF INTEREST

None.

References

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Figure 0

Fig. 1. SEIR compartment model. Epidemiological states: S, susceptible (healthy population at risk of contracting the disease); E, exposed (infected, but not yet infectious); I, infectious (infected and infecting others, capable of transmitting the disease); R, removed or recovered (population that dies or recovers from the disease); C, is not a compartment (includes I and R); β, transmission rate; ε, incubation rate (per unit time); γ, recovery rate (per unit time); 1/γ, average recovery period; μ*, population birth rate; μ, population death rate; α, immunity loss rate.

Figure 1

Table 1. Epidemiological states and epidemiological features present in the SEIR compartment model. Explanation in extenso are reported in the text

Figure 2

Table 2. Epidemiological features of three EHF outbreaks

Figure 3

Fig. 2. Results of STEM simulation of the Uganda scenario. (a) Map view of the geographical distribution of the disease deaths; in particular, in the square with a red border the main information is reported: i.e. the name of the region considered, the area extension in km2 and the coordinates of the region, the population numbers before the disease occurred, the population numbers after the period considered that the disease occurred and the end time of the period considered. (b) Disease deaths, (D)t. (c) Infected people, (I)t. (d) Recovered people, (R)t. Time in days.

Figure 4

Table 3. Results of the three EHF outbreaks simulation. Real and simulated data are reported together with a percentage estimation of the accuracy

Figure 5

Fig. 3. Results of STEM simulation of the Gabon scenario. (a) Map view of the geographical distribution of the disease deaths; in particular, in the square with the red border the main information is reported: i.e. the name of the region considered, the area extension in km2 and the coordinates of the region, the population numbers before the disease occurred, the population numbers after the period considered that the disease occurred and the end time of the period considered. (b) Disease deaths, (D)t. (c) Infected people, (I)t. (d) Recovered people, (R)t. Time in weeks.

Figure 6

Fig. 4. Results of STEM simulation of the Guinea scenario. (a) Map view of the geographical distribution of the disease deaths; in particular, in the square with the red border the main information is reported: the name of the region considered, the area extension in km2 and the coordinates of the region, the population numbers before the disease occurred, the population numbers after the period considered that the disease occurred and the end time of the period considered. (b) Disease deaths, (D)t. (c) Infected people, (I)t. (d) Recovered people, (R)t. Time in weeks.