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Effective case/infection ratio of poliomyelitis in vaccinated populations

Published online by Cambridge University Press:  02 February 2016

G. BENCSKÓ
Affiliation:
Polymer Chemistry Research Group, Institute of Materials and Environmental Chemistry, Research Centre for Natural Sciences, Hungarian Academy of Sciences, Budapest, Hungary Institute of Chemistry, Eötvös Loránd University, Budapest, Hungary
T. FERENCI*
Affiliation:
John von Neumann Faculty of Informatics, Physiological Controls Group, Óbuda University, Budapest, Hungary
*
*Author for correspondence: Dr T. Ferenci, John von Neumann Faculty of Informatics, Physiological Controls Group, Óbuda University, H-1034, Bécsi út 96/b, Budapest, Hungary. (Email: [email protected])
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Summary

Recent polio outbreaks in Syria and Ukraine, and isolation of poliovirus from asymptomatic carriers in Israel have raised concerns that polio might endanger Europe. We devised a model to calculate the time needed to detect the first case should the disease be imported into Europe, taking the effect of vaccine coverage – both from inactivated and oral polio vaccines, also considering their differences – on the length of silent transmission into account by deriving an ‘effective’ case/infection ratio that is applicable for vaccinated populations. Using vaccine coverage data and the newly developed model, the relationship between this ratio and vaccine coverage is derived theoretically and is also numerically determined for European countries. This shows that unnoticed transmission is longer for countries with higher vaccine coverage and a higher proportion of IPV-vaccinated individuals among those vaccinated. Assuming borderline transmission (R = 1·1), the expected time to detect the first case is between 326 days and 512 days in different countries, with the number of infected individuals between 235 and 1439. Imperfect surveillance further increases these numbers, especially the number of infected until detection. While longer silent transmission does not increase the number of clinical diseases, it can make the application of traditional outbreak response methods more complicated, among others.

Type
Original Papers
Copyright
Copyright © Cambridge University Press 2016 

INTRODUCTION

Poliomyelitis is an acute viral infectious disease caused by poliovirus, an enterovirus belonging to the family Picornaviridae. Most human poliovirus infections remain asymptomatic, with the infection localized to oropharynx and the gut or symptomatic but only presenting as mild disease with no sign of central nervous system invasion [Reference Atkinson, Wolfe and Hamborsky1]. However, in the remaining 1–2% of cases, poliovirus enters and replicates in the motor neurons of the anterior horn cells of the spinal cord, the brainstem or the motor cortex of the brain, causing destruction of the affected neurons, which results, among other things, in acute flaccid paralysis (AFP) [Reference Wilson and Sande2].

There are two types of vaccines available against polio: inactivated polio vaccine (IPV) and live attenuated oral polio vaccine (OPV) [Reference Plotkin, Orenstein and Offit3]. OPV provides strong enteric mucosal immunity thereby providing good protection against carriage and shedding of the virus, while IPV results only in systemic immunity protecting against clinical disease, but much less against the enteral shedding of the virus [Reference Tebbens4].

With the introduction of safe and effective vaccines, polio became a technically eradicable disease [Reference Aylward5] and the global efforts led to a marked decrease in disease incidence and the number of endemic countries [Reference Hagan6, Reference Bahl7]. However, the very final step towards complete eradication turned out to be especially difficult [8].

In particular, an outbreak at the end of 2013 in the Middle East with 36 cases of polio in Syria and isolation of wild-type poliovirus 1 from sewage and faecal samples from asymptomatic carriers in Israel have raised concerns that the polio might endanger Europe [9]. These fears were widely raised again when circulating vaccine-derived poliovirus 1 caused two cases of polio (as of September 2015) in Ukraine [10].

Recently, Eichner & Brockmann [Reference Eichner and Brockmann11] warned that infected individuals can spread the virus unrecognized in an IPV-vaccinated environment (due to the lack of mucosal immunity) and calculated how long the virus can spread across the population, assuming a borderline effective reproduction number R = 1·1, before one AFP case is identified and an outbreak is detected.

They stated, inter alia, that ‘only one in 200 unvaccinated individuals infected with WPV1 will develop acute flaccid paralysis (case/infection ratio C = 0·005)’ and that within n transmission generations, (Rn +1 − 1)/(R − 1) is the cumulative number of infections that are expected to be seen. However, they went on to calculate the number of AFP cases by multiplying those two factors. This – as made explicit by the original authors: ‘[the application of IPV] further reduces the ratio of acute flaccid paralysis to infection’ – is only an approximation, as part of the infected people, in some countries the majority, will be (IPV-) vaccinated. Thus, the ‘effective’ case/infection ratio in an – at least partly – IPV-vaccinated population will be lower, making the results (i.e. the length of unnoticed transmission) even more marked.

Similar problems have already been investigated in the literature, for instance Eichner & Dietz [Reference Eichner and Dietz12] presented a comparable analysis; however, they relied on a stochastic model described with differential equations, which is more realistic, but much less interpretable. In contrast, the simple model of Eichner & Brockmann is more directly interpretable. A novel model will be now devised to take the aforementioned aspect into account, thereby enhancing the validity of the simple model, but still retaining its perspicuity. The consequences of the application of the new model will be illustrated in various European countries using empirical data.

Although borderline transmission (R = 1·1) is assumed throughout the paper, it should be noted that the actual R values are heterogeneous for different populations (depending, for example, on the vaccination coverages), thus this paper describes a conditional calculation, a ‘what-if’ analysis, describing what happens if the importation and silent transmission (R = 1·1) has already occurred.

METHODS

First, a simple model will be discussed where the population is divided into ‘vaccinated’ and ‘unvaccinated’ compartments. After that, the model will be extended to take into account the differences between IPV and OPV.

Two-compartment model

To illustrate our logic, consider first a two-compartment case, i.e. ‘unvaccinated’ and ‘vaccinated’ compartments of the population. A single index case exposes R 0 people to polio, where R 0 denotes the basic reproduction number of the disease. Assuming homogeneous mixing within the population, this will mean R 0·(1 − V) unvaccinated and R 0·V vaccinated people exposed, where V is the proportion of the population vaccinated. Denoting the vaccine's effectiveness against infection (thus, the shedding of the virus) VE inf, we will have R 0·(1 − V) and R 0·V·(1 − VE inf) infected people after the first generation in the unvaccinated and vaccinated compartments, respectively. Note that VE inf is not the ‘traditional’ vaccine effectiveness which is defined as the effectiveness against clinical disease [Reference Orenstein13]. In the current context, this is related to the mucosal immunity conferred by the vaccine.

Therefore we have

$$\eqalign{R_0 \cdot \left( {1 -{V}} \right) + R_0 \cdot V\cdot \left( {1 -{VE}_{{\rm inf}}} \right) = R_0 \cdot \left( {1 -V\cdot {VE}_{{\rm inf}}} \right)}$$

infected in the population after the first generation which will be the effective reproduction number (R) of polio infection; thus we also see that R 0 = R/(1 − V·VE inf).

At this point, instead of multiplying the number of infected in both compartments by C, the correct calculation goes on to presume that we will have R 0·(1 − VC clinical cases only in the unvaccinated compartment; however, in the vaccinated compartment we will have only

$$R_0 \cdot V\cdot \left( {1 -{VE}_{{\rm inf}}} \right)\cdot \left( {1 -{VE}_{{\rm clin}}} \right)\cdot C$$

manifest cases, where VE clin represents the effectiveness of the vaccine to protect an already infected subject from developing clinical disease (i.e. it is a conditional probability). In this context, this will be related to the systemic immunity conferred by the vaccine. Thus, the number of clinical cases will be

$$\eqalign{& R_0 \cdot \left( {1 -V} \right)\cdot C + R_0 \cdot V\cdot \left( {1 -{VE}_{{\rm inf}}} \right)\cdot \left( {1 -{VE}_{{\rm clin}}} \right)\cdot C \cr & \; = R_0 \cdot C\cdot \left[ {\left( {1 -V} \right) + V\cdot \left( {1 -{VE}_{{\rm inf}}} \right)\cdot \left( {1 -{VE}_{{\rm clin}}} \right)} \right]} $$

after the first generation resulting from a single index case.

It should be noted that the usual vaccine effectiveness (i.e. effectiveness against clinical disease) is

$${VE} = 1 - \left( {1 -{VE}_{{\rm inf}}} \right)\cdot \left( {1 -{VE}_{{\rm clin}}} \right).$$

Substituting this to the previous formula, we obtain that the number of clinical cases will be

$$\eqalign{& R_0 \cdot C\cdot \left[ {\left( {1 -V} \right) + V\cdot \left( {1 -{VE}} \right)} \right] \cr & \qquad = R_0 \cdot C\cdot \left( {1 -V\cdot {VE}} \right),}$$

or, equivalently, using the effective instead of basic reproduction number

$$R/\left( {1 -V\cdot {VE}_{{\rm inf}}} \right)\cdot C\cdot \left( {1 -V\cdot {VE}} \right)$$

after the first generation.

After n generations, the number infected will be (Rn +1 − 1)/(R − 1) and not R, therefore the number of clinical cases will be

$$\eqalign{&\displaystyle{{R^{n + 1} - 1} \over {R - 1}} \cdot \displaystyle{1 \over {1 - V \cdot {VE}_{\inf}}} \cdot C \cdot \left( {1 - V \cdot {VE}} \right) \cr & = \displaystyle{{R^{n + 1} - 1} \over {R - 1}} \cdot \left( {C \cdot \displaystyle{{1 - V \cdot {VE}} \over {1 - V \cdot {VE}_{\inf}}}} \right).}$$

The factor in parentheses at the right hand side is the correct multiplier that should be used (instead of C). We designate this the effective case/infection ratio, or C eff, and designate the multiplier of C, i.e. the correction factor that should be used to take the vaccination of the population into account, ϕ eff. That is, here

$$\phi _{\rm eff} = \displaystyle{{1 - V \cdot {VE}} \over {1 - V \cdot {VE}_{\inf}}}, $$

and to determine the expected number of transmission generations that are necessary to reach one case of AFP we must solve the equation

$$\eqalign{&C_{{\rm eff}} \cdot \left( {R^{n + 1} - 1} \right)/\left( {R- 1} \right) \cr &\quad = C\cdot \phi _{{\rm eff}} \cdot \left( {R^{n + 1} - 1} \right)/\left( {R- 1} \right) = 1}$$

with respect to n. Here, R specifies the predetermined level of ‘borderline transmission’, e.g. R = 1·1 as in [Reference Eichner and Brockmann11], or any other desired level.

By solving this, we obtain that log R [1 + (R − 1)/(C·ϕ eff)] − 1 transmission generations are expected to be needed for the first clinical case to appear, hence the expected time to detect the virus circulation (hereafter designated ‘time-to-detect’), assuming that only AFP surveillance is used, is

$$t_{{\rm gen}} \cdot \left[ {\log _R \left( {1 + \displaystyle{{R - 1} \over {C \cdot \phi _{{\rm eff}}}}} \right) - 1} \right],$$

where t gen is the generation time of polio, assumed to be t gen = 10 days [Reference Nathanson and Kew14]. The number of infected until this time (hereafter designated ‘infected-to-detect’) will be 1/(C·ϕ eff)

Three-compartment model

The two-compartment approximation is inadequate as it cannot accommodate the IPV and OPV vaccinations, which is a crucial component in real-world settings. Thus, we have to extend this approach to include three compartments: ‘Unvaccinated’, ‘Vaccinated with OPV’ and ‘Vaccinated with IPV’. [The question might be raised whether a ‘Vaccinated sequentially (i.e. IPV followed by OPV)’ compartment is needed. However, the immunity profile conferred by this schedule is similar to the one from the OPV-only schedule [15], so for simplicity we will consider those vaccinated sequentially as if they were vaccinated with OPV.]

It is straightforward to extend the logic seen above for this case (the role of the IPV and OPV compartments is symmetric, but with different coverage and vaccine-effectiveness parameters, which appear as multipliers in the formula), the result will be:

$$\phi _{{\rm eff}} = \displaystyle{{1 - V^{{\rm OPV}} \cdot {VE}^{{\rm OPV}} - V^{{\rm IPV}} \cdot {VE}^{{\rm IPV}}} \over {1 - V^{{\rm OPV}} \cdot {VE}_{\inf} ^{{\rm OPV}} - V^{{\rm IPV}} \cdot {VE}_{\inf} ^{{\rm IPV}}}}, $$

and the equation for the detection of the first AFP case is the same with R≈1·1 and C eff = C·ϕ eff again. The formulae to calculate the time-to-detect the first clinical case, and the number of infected until this time is unchanged (with the new ϕ eff applied).

While this result is theoretically sound, quantitative estimation is bound to run into serious difficulties due to the limited information available to numerically estimate the parameters that appear in the above formulae. Owing to the high variability in the estimates of these parameters, there is no point in aiming to obtain more than an approximate C eff. We also perform a sensitivity analysis in order to ensure robustness with respect to this uncertainty.

Calculating vaccine coverage

The proportion of the population vaccinated with OPV and IPV (i.e. V OPV and V IPV) was calculated using population age distribution as of 1 January 2013. For countries that always used IPV-only schedule, the number of (IPV) vaccinees were calculated exactly for birth years where vaccine coverage was available, for the remaining birth cohorts, the average of all vaccine coverages was assumed as the vaccine coverage. For countries that switched from OPV to IPV, the number of IPV vaccinees were calculated exactly, the number of OPV vaccinees were calculated using the average vaccine coverage for the OPV-only years. We considered that only those who are vaccinated are protected, i.e. we neglected the possible spread of the vaccine virus (which is possible for OPV, but unlikely to play a significant role).

Information on vaccine coverage was extracted from the World Health Organization's Centralized Information System for Infectious Diseases (CISID) [16]. This relies on national coverage reports and WHO/UNICEF coverage estimates, the methodology is described elsewhere [Reference Burton17]. Indicator number 3004 (‘Polio3 – % of infants vaccinated against’) was employed in the present study.

To assess the size of birth cohorts, we used the dataset demo_pjan from Eurostat [18].

The historical changes in vaccination schedules, in particular the switch from OPV to IPV was determined using data from the European Centre for Disease Prevention and Control [9].

Spreadsheet data compiled from the above data sources is presented in Supplementary Table S1.

Calculating vaccine effectiveness

As far as the VE inf values are concerned, the best information we can use are studies that measured vaccine virus shedding after OPV challenge. From a recent review [Reference Hird and Grassly19] we can deduce VE OPV inf = 0·87 and VE IPV inf = 0·19 (by subtracting the odds ratios against shedding presented there from 1). Note that this approach means that for calculation of VE inf, only the fact of shedding (i.e. whether infection occurred at all or not) is taken into account, but not the duration of shedding or the quantity of shed virus. This can be justified by the currently used definition of VE inf, in which only the fact of infection matters (duration of shedding and quantity of shed virus is relevant only for the exposure of the environment).

For VE, we can use VE OPV = VE IPV = 0·9, which is reasonable for developed countries [Reference Okayasu20].

Sensitivity analysis

As the parameters used in the devised model (especially VE inf) are only known with substantial uncertainty, sensitivity analysis was also undertaken, using Monte Carlo simulation [Reference Saltelli21]. In this approach, the parameters are assumed to have a distribution (as opposed to being fixed values), therefore their functions, such as time-to-detect the first case, will also be random variables. However, the exact distribution of these functions is often unfeasible or impossible to analytically derive from the distribution of the inputs and the functional form, so instead it can be empirically approximated by generating many random variates from the input's distribution, transforming them according to the function, and then estimating the distribution from those transformed variables [Reference Saltelli21]. This method can be viewed as a way to improve robustness against the uncertainty of the parameters.

In the current case, sensitivity analysis was performed with respect to both VE inf values. Their distribution was presumed to be independent truncated normal with the mean given by the point estimate already introduced, and the standard deviation being 0·04 for VE OPV inf and 0·13 for VE IPV inf. These values were chosen so that the resulting distributions' dispersion roughly corresponds to the confidence intervals already known [Reference Hird and Grassly19]. Truncation was done at [0, 0·9] to ensure that both VE inf and VE clin values are between 0 and 1. One million random variates were simulated and the resulting distribution was reconstructed with kernel density estimation [Reference Silverman22].

Programs used

Sensitivity analysis, visualization and additional calculations were performed under Wolfram Mathematica v. 10.0 [23]. Full source codes are available from the corresponding author upon request.

RESULTS

Parameter ϕ eff as a function of vaccine coverages is shown in Figure 1.

Fig. 1. Parameter ϕ eff (i.e. the factor with which the case/infection ratio should be multiplied to obtain the effective case/infection ratio in a given population) as a function of vaccine coverage. Panel (a) shows it as a three-dimensional plot; panel (b) depicts the same function as a contour plot, with the colour scale indicating the function value. Red lines in (b) indicate locations of equal (overall) vaccine coverage, with dots depicting selected representative countries (BG, Bulgaria; AT, Austria; FR, France; NO, Norway; NL, The Netherlands).

Table 1 shows the estimated parameters, together with the length of time-to-detect of the first clinical case (i.e. silent transmission) and infected-to-detect that is derived from them.

Table 1. Estimated vaccine coverage together with ϕ eff and C eff parameters calculated from them and the resulting time-to-detect and infected-to-detect for each investigated country

Figure 2 shows the results of sensitivity analysis for time-to-detect in case of a few representative countries (that were chosen to exemplify the practically occurring combinations of vaccine coverages in European countries).

Fig. 2. Distribution of time-to-detect under parameter uncertainty for selected representative countries (BG, Bulgaria; AT, Austria; FR, France; NO, Norway; NL, The Netherlands).

The Netherlands and Norway represents the IPV-only countries (with relatively high and low IPV coverage, respectively) which have the highest time-to-detect values and also their peaks in Figure 2 are broader than the mostly OPV-vaccinated Western European countries (Austria and France), since they are more sensitive towards the VE IPV inf to which a higher standard deviation value was chosen during the sensitivity analysis. Bulgaria represents the Central and Eastern European countries with very high OPV vaccination coverage and hence with the lowest time-to-detect values. The broadness of its peak can be explained by the very low proportion of unvaccinated individuals.

DISCUSSION

The length of silent transmission, i.e. the time needed to detect the first infected by traditional means (i.e. AFP surveillance and not environmental surveillance) depends on vaccine coverage both from OPV and IPV, in a nonlinear way. With all other things being equal, increasing coverage from either of them decreases the effective case/infection ratio (thus increasing the length of unnoticed transmission), but this is almost negligible for OPV, although rather substantial for IPV. If the overall coverage is considered fixed, the effective case/infection ratio radically decreases with increasing proportion of IPV coverage. In other words, the effective case/infection ratio will be lowest for countries where (1) overall vaccine coverage is high and (2) the proportion of IPV within this coverage is also high. Decreasing effective case/infection ratio means increased length of silent transmission (thus increased number of infected until the outbreak is detected), therefore the effect of increasing vaccine coverage might be – in this sense – counterintuitive for time-to-detect and infected-to-detect.

In European countries, assuming borderline transmission (R = 1·1) the length of unnoticed transmission is between 326 days and 512 days using the developed model. In line with the previous remark, those countries are at the lower end, where the overall vaccine coverage is low or the proportion of IPV coverage is low within the overall coverage (e.g. Portugal, Cyprus or Malta on the one hand, and Bulgaria, UK or Germany on the other), and those are at the higher end where the overall vaccine coverage is high and the proportion of IPV coverage within the overall coverage is also high (e.g. The Netherlands, Norway or Denmark).

The range of 326–512 days is in contrast with the results of Eichner & Brockmann [Reference Eichner and Brockmann11]; in their article, which neglects the effects of IPV coverage, the length of unnoticed transmission is given as ‘nearly 1 year’ (309 days, precisely). Thus, more elaborate analysis shows that the actual length of silent transmission might be more than 50% longer than what can be derived from the simpler model, depending on the circumstances (i.e. vaccine coverage).

It also instructive to contrast these results with their theoretical limits. For zero vaccine coverage (from both types of vaccines), the effective case/infection ratio will be the same as the traditional case/infection ratio (0·5%), resulting in the already mentioned 309 days, with 200 infections until detection. At the other extreme, with perfect coverage from IPV, the duration of unnoticed transmission is 524 days, with 1620 infections. It can be seen that European countries span the entire spectrum quite well.

It is worth noting that the time-to-detect depends on what R we presume as ‘borderline’ (e.g. R = 1·1), but the ϕ eff does not, therefore the infected-to-detect also does not, as it only depends on effective C.

Sensitivity analysis reveals some uncertainty in these results due to parameter uncertainty, but qualitatively, the conclusions are left unaffected. For instance, the variation in the time-to-detect the first infected is about ±25–50 days, depending on the exact circumstances.

It should be noted that ‘worst-case’ now means a large number of infected, not a large number of (clinically) ill, so one might wonder whether this phenomenon is worrisome at all. While directly there is no risk of disease involved for the majority of those who are IPV vaccinated even if they are carriers, first, there is always a minority (as the IPV's effectiveness is not 100%, even against clinical disease), and second, not everyone can be vaccinated, for instance due to their age. Moreover, lengthy time until detection can make the traditional outbreak response methods, such as contact tracing, very complicated or downright impossible, thus this is still relevant for public health purposes.

Note that the above calculation assumes that the very first AFP case is detected, and the outbreak is instantly identified (in line with Eichner & Brockmann [Reference Eichner and Brockmann11]). This is clearly not a realistic assumption, since the sensitivity of AFP surveillance can never be 100%, even in developed countries [Reference Gary, Sanders and Pallansch24, Reference Watkins25]. The effect of sensitivity on the investigated outcomes is not linear. To see this, we denote sensitivity with s, then the equation to be solved is not

$$\eqalign{& C\cdot \phi _{{\rm eff}} \cdot \left( {R^{n + 1} - 1} \right)/\left( {R- 1} \right) = 1,\; \; \; {\rm but \; rather}\; \; \; \cr & C\cdot \phi _{{\rm eff}} \cdot \left( {R^{n + 1} - 1} \right)/\left( {R- 1} \right) = 1/s} $$

(as s sensitivity means that only every (1/s)th case is identified as such). Thus, the actual time-to-detect the outbreak, taking the sensitivity of the surveillance into account is

$$t_{{\rm gen}} \cdot \left[ {\log _R \left( {1 + \displaystyle{{\left( {R - 1} \right)/s} \over {C \cdot \phi _{{\rm eff}}}}} \right) - 1} \right],$$

and the number of infected until this point is 1/(C ϕ eff s) using the same logic. This is illustrated on Figure 3 for a few selected European countries. It can be seen that the effect of non-perfect surveillance sensitivity is not substantial up to about 30–40%, and it has much more profound impact on infected-to-detect than on time-to-detect. (Understandably, as the number of cases rises increasingly faster due to geometric growth if more transmission generation is allowed. Imperfect surveillance acts as if ϕ eff were further decreased.)

Fig. 3. Impact of the sensitivity of acute flaccid paralysis (AFP) surveillance on the (a) time-to-detect and (b) infected-to-detect for selected representative countries (BG, Bulgaria; AT, Austria; FR, France; NO, Norway; NL, The Netherlands).

Finally, it is important to emphasize that this model in no way predicts the probability of such importation of polio to Europe, i.e. that transmission begins. The calculation of the actual R values (which can be highly heterogeneous for European populations) or the determination of the probability of a continuous transmission (R > 1) are beyond the scope of this paper: R depends on vaccine coverage, contact patterns, demography, hygiene, etc. The presented calculation is conditional, a ‘what-if’ analysis, describing what happens if the importation and silent transmission (R = 1·1) has already occurred. Note that presuming different countries have the same R is unrealistic, thus comparing countries with each other is only valid for infected-to-detect (which does not depend on R) at first glance. Nevertheless, the comparison of time-to-detect still makes sense, as it allows investigation of how IPV and OPV vaccine coverage alters the length of silent transmission in an outbreak.

Naturally, our model has several limitations. One is that countrywide vaccine coverage data were used, which neglects within-country spatial inhomogeneity of vaccine coverage (clustering of unvaccinated individuals), which is otherwise known to be an important factor in disease outbreaks. (This is a violation of the compartmental models' ‘perfect mixing’ assumption.) Due to the fact that the transmission is more likely to start and amplify in such – undervaccinated – clusters, the detection might also be earlier, at least if we assume equal quality of AFP surveillance, even in such clusters. In a similar manner, ‘perfect mixing’ assumption also neglects every stratification of the populations, such as their age and sex distribution; despite the fact that age definitely has a profound impact on the spread of polio. This is, however, unlikely to introduce a systematic error as there are no marked differences in European countries' age and sex composition, apart from the fact that IPV coverage might vary substantially for different age groups. Nevertheless, it would be straightforward to extend the model to incorporate such strata by the introduction of additional compartments (at the price of the introduction of further parameters that are to be estimated), should it be deemed necessary. Finally, the model presumes a deterministic reproduction from generation to generation (i.e. it is governed by the single parameter R). While this is acceptable if R is considered to be an expected value, a finer analysis would be possible by recasting the problem as a, possible multi-type, branching process, which is often applied to describe epidemics [Reference Mode and Candace26]. In the branching process approach, the number of secondary infections is considered to be a true random variable (not a single number), allowing more precise modelling, which is valid if the number of infected is small compared to the whole population (as is the case in the present situation). This, however, comes at the price of more complicated mathematical structure.

SUPPLEMENTARY MATERIAL

For supplementary material accompanying this paper visit http://dx.doi.org/10.1017/S0950268816000078.

ACKNOWLEDGEMENTS

The authors express their sincere gratitude to Mihály Sulyok (Institute for Tropical Medicine, Eberhard Karls University, Tübingen, Germany) for the selfless, enthusiastic and rapid support he provided in finalizing the manuscript. The authors are also very grateful to András Lakos (Centre for Tick-borne Diseases, Budapest, Hungary) for his thorough revision of the manuscript, Gergely Gánics (Universitat Pompeu Fabra, Barcelona, Spain) for his support throughout the entire research and Gergely Röst (Bolyai Institute of Mathematics, University of Szeged, Szeged, Hungary) for checking the mathematics of the manuscript. The authors are grateful for kind remarks of Mária Takács (Department of Virology, National Centre for Epidemiology, Budapest, Hungary).

This research received no specific grant from any funding agency, commercial or not-for-profit sectors.

DECLARATION OF INTEREST

None.

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Figure 0

Fig. 1. Parameter ϕeff (i.e. the factor with which the case/infection ratio should be multiplied to obtain the effective case/infection ratio in a given population) as a function of vaccine coverage. Panel (a) shows it as a three-dimensional plot; panel (b) depicts the same function as a contour plot, with the colour scale indicating the function value. Red lines in (b) indicate locations of equal (overall) vaccine coverage, with dots depicting selected representative countries (BG, Bulgaria; AT, Austria; FR, France; NO, Norway; NL, The Netherlands).

Figure 1

Table 1. Estimated vaccine coverage together with ϕeff and Ceff parameters calculated from them and the resulting time-to-detect and infected-to-detect for each investigated country

Figure 2

Fig. 2. Distribution of time-to-detect under parameter uncertainty for selected representative countries (BG, Bulgaria; AT, Austria; FR, France; NO, Norway; NL, The Netherlands).

Figure 3

Fig. 3. Impact of the sensitivity of acute flaccid paralysis (AFP) surveillance on the (a) time-to-detect and (b) infected-to-detect for selected representative countries (BG, Bulgaria; AT, Austria; FR, France; NO, Norway; NL, The Netherlands).

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