The basic model

To assess the potential for antiviral drugs to mitigate transmission, we begin with the baseline model depicted in Figure 1, in which homogeneous individuals mix uniformly and experience transitions between the Susceptible, Infective and Removal states over time. A removal is an individual who is immune as a consequence of vaccination or recovery from an infection. Let , and denote the proportion of individuals who are susceptible, infectious and removed at time . The equations describing transmission and recovery are(1)where governs the rate of transmission and is the recovery rate. For our purpose, we have added to the standard SIR epidemic model a rate of immunisation by vaccination and a rate of importing newly infected individuals from other locations. These two rates may be time-dependent. The initial reproduction number is the number of secondary infections generated by a typical single primary case at the beginning when no one else has been infected. For this model it is given by . We do not refer to this as the basic reproduction number because we allow for the possibility that awareness of a new pandemic strain may have changed behaviour and individuals may have some immunity against the new strain from previous exposure to other influenza strains.

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Figure 1. Baseline transmission model.

Mass vaccination and arrival of infected individuals from other locations has been added to the standard SIR transmission model.

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Our concern is with a strain of influenza that is newly emerged and so individuals can be vaccinated only when a strain-specific vaccine has been developed and tested. To accommodate this delay, the rate of immunising susceptible individuals is assumed to have the formwhere is the time when the new vaccine is ready to be dispensed. A time-varying rate of importing new infectives is realistic, but here we restrict attention to a constant importation rate .

Our main focus is on using antiviral drugs for prophylaxis, to hopefully contain or delay widespread transmission. For the moment suppose that each individual is symptomatic and presents to the health service following onset of their symptoms. We assume that each newly diagnosed case triggers the dispensing of doses of antiviral drugs to individuals who have been exposed to or are a potential contact of that case. It is meaningful to allow non-integer values for if we interpret it to be the average number of doses dispensed per case. In our model the effect of dispensing antiviral doses per case is to reduce the transmission rate to , where the factor decreases as increases and . Here we use the form(2)for a variety of values of and satisfying and , so that decreases from 1 to as increases. This form for acknowledges that the first few doses dispensed are likely to reduce transmission more effectively because they target the closest associates of the case. The effect on the reproduction number is to reduce it from to , which is less than unless .

To monitor the depletion of the stockpile of antiviral drugs we define  =  (total number of doses in the stockpile remaining at time )/(population size).

Then , the initial number of doses per individual, is the initial size of the stockpile relative to the population size. When we dispense doses for each new case we find(3)

A variety of values for the parameters , , , , and are used. In Table 1 we show baseline values for these parameters that seem relevant in planning preparedness for pandemic influenza, where the values of , , and are rates per day. Results presented here are based on these baseline parameter values unless indicated otherwise. Initially we assume that everyone is susceptible, i.e. and . Transmission is seeded by the importation of infectives.

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Table 1. Baseline values for model parameters.

https://doi.org/10.1371/journal.pone.0017764.t001

The recovery rate gives a mean infectious period of four days, the vaccination rate means that once developed the vaccine can be given to 1% of the population per day and means that the chance of transmission per close contact can be reduced by at most 50% by liberal use of antiviral drugs. The value days assumes that it takes five months to develop a vaccine and get it ready for distribution.

A baseline initial value of , when planning to prepare for pandemic influenza, seems sensible on the basis of past experience. Attack rates observed during the pandemics of 1918, 1957, 1968 and 2009 are, for the most part, consistent with , or less. It is, of course, possible that a pandemic strain with a higher transmission rate might evolve. Indeed, the basic reproduction number of the 1918 pandemic strain was almost certainly substantially higher, but compliance with public health measures based on social distancing during this pandemic was high because of the recognised severity of the disease. This is evident by observing how incidence changed as social distancing measures were introduced and removed; see Caley et al. [21]. As a result, although susceptibility was uniformly high the effective reproduction number, prior to depletion of susceptibles, was about 1.5. A high level of compliance is also likely in the event of a future pandemic strain with severe disease, suggesting that an initial effective reproduction number below 1.5 is likely from social distancing measures alone.

Distributing antiviral drugs to affected households

It is natural that individuals responsible for distributing antiviral drugs are concerned about wastage in attempts to reduce transmission, when these drugs are thought necessary to treat severe cases and to protect essential-service personnel, such as health care workers and police, [17]. Faced with competing demands it is tempting to limit community distribution of antiviral drugs to cases with laboratory-confirmed infection and individuals with confirmed exposure. Unfortunately, laboratory confirmation and contact tracing are time consuming and insistence on such confirmation makes it impossible to administer antiviral drugs quickly enough to contain transmission. A strategy of dispensing antiviral drugs quickly and liberally to household members as soon as the first household case presents seems to be what is needed. A focus on households helps to clarify who is targeted for antiviral prophylaxis and the co-location of its members makes timely dispensing to exposed individuals feasible. We therefore look at transmission in a community of households with a focus on timeliness and transmission characteristics that make containment of transmission feasible. For such a community is useful to work with the reproduction number for infected households, [22], [23], [24], which we denote .

To incorporate the effect of antiviral drugs on transmission into the calculation of and the mean number of eventual cases, we adopt the effect formulation of Glass and Becker [25]. They model the effect of antiviral drugs by a change in the population dynamics of the virus population within the host and translate this to the corresponding change in , the probability that a susceptible individual avoids being infected by a single infected household member of generation . Infectives of one generation are the individuals infected by the infectives of the previous generation, where household generation 0 contains only the primary household case. For our purpose we also include the corresponding effect on , the mean number of cases a generation- infective generates outside their household. As in [25], individuals who are not infectives of generations 0 and 1 are assumed to receive antiviral drugs before being infected and therefore derive the full protective effect of these drugs. Then the values of the probabilities are same for . As in [25], we use a Reed-Frost model, [26], [27], for within-household transmission with the modification that the probability of avoiding infection is generation-dependent. The 2001 Australian census data was used to allocate a distribution to household size. With these specifications we compared the value of the reproduction number for three different settings, namely when (i) no antiviral drugs are dispensed, (ii) doses are dispensed to household members two days after the primary case is infected, and (iii) doses are dispensed four days after the primary case is infected.

In order to determine the largest fraction of non-compliance that still permits transmission to be contained, we also compute the effect of antiviral drugs on the reproduction number when a fraction of primary household cases fails to present early enough for the household to receive antiviral drugs.

Finally, we determine how many household outbreaks might need to be observed to provide evidence that the antiviral drugs are indeed effective against the newly emerged virus strain. Here we look at establishing effectiveness via a simple comparison of the mean outbreak size in households that receive antiviral drugs early with the mean outbreak size in households that receive them late. This comparison of means must accommodate heterogeneity in variances and a number of tests permit this. We have chosen to use the Alexander-Govern test [28], because its computations are relatively simple, good performance has been demonstrated [29] and it provides a simple and direct way to combine the comparisons for households of different sizes.

Transmission: contained or not contained

The model given by equations (1)–(3) was used, with a range of plausible parameters values, to determine the eventual attack rate (percentage of the population infected). The consistent findings are illustrated in Figure 2, which shows the eventual attack rate as given by the model with (a) and (b) and other parameters assuming the baseline values of Table 1. The smallest value for is 0.75 when and 1.125 when .

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Figure 2. Eventual attack rate (AR).

Percentage of the population infected, as predicted by the baseline model with (a) and (b) , for different (stockpile size, as a proportion of the population size) and (number of antiviral doses dispensed per case). Colours on the graphs range from dark blue (low values) to dark red (high values).

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For all parameter values, increasing from zero decreases the transmission rate and this is reflected in a decline in the eventual attack rate . For larger values of , we see an increase in as increases. This arises because the value of the transmission rate returns to as the stockpile is depleted and epidemic transmission resumes (slightly tempered by a depletion of susceptibles).

When can be brought below 1, as in Figure 2(a), there is a very steep decline in as increases and approaches 1. Note that remains very low for a substantial range of values of . The range of values for which transmission is contained depends on the size of the stockpile. The existence of a wide range of near-optimal values for and the fact that transmission is contained for any value of in this range provide realistic scope for practical and effective use of antiviral drugs for prophylaxis.

In contrast, when cannot be brought below 1, as in Figure 2(b), a small value of can induce a reduction in the attack rate. However, noting the scale on the vertical axis in Figure 2(b), we see that the reduction is small and very localised. It is difficult to utilise this optimal dosage in practice because its value depends on factors that are unknown and difficult to estimate with adequate precision.

Number of doses of antiviral drugs dispensed

The eventual number of antiviral doses dispensed per community member can be computed numerically from equations (1)–(3). When transmission can be contained, it is more informative to work with a simple expression that approximates antiviral usage, because this expression reflects directly how various factors affect the usage.

When remains below 1 there is relatively little depletion of susceptibles, so we may writeThen the fraction of infectives is soon near its equilibrium value of and the number of doses of antiviral drugs dispensed per community member is approximately(4)where is the time when the vaccine is ready to be dispensed and is the additional time required to reach a vaccination coverage that brings the effective reproduction number below 1. By way of illustration, note that equation (4) indicates that the required number of antiviral drug doses will be equal to 1.2% of the population size when and other parameters assume their baseline value. This allows for one imported infective per day for every million population members, for a duration of six months, and all the transmission chains they generate. Prior to the 2009 pandemic many nations held antiviral stockpiles with doses that numbered more than 20% of their population. Only a small fraction of this would be needed for sustained containment of transmission until the vaccine controls transmission.

The 1.2% we calculated above is based on sustained containment for six months. When containment is not achievable we would become aware of this quite early and would abandon the attempt of containment having spent a small fraction of the stockpile. For example, Becker et al. [30] show that a useful estimate of the initial reproduction number is obtained once the cumulative incidence reaches 350–500 cases. With doses per case and a population of 1 million, we would therefore abandon the attempt at containment having spent antiviral doses numbering less than 0.05% of the population size if the estimate of indicates containment is infeasible.

More generally, the total number of antiviral doses used, as given by (4), increases linearly with the rate of importations (), and the time until the vaccine is able to control transmission (). Together, these terms contribute the factor , which is the mean number of importations of infected cases from the start of the pandemic until the vaccine is able to reduce the reproduction number below 1. The remaining factor in (3) is , the mean number of doses dispensed for each outbreak initiated by a single infective. Its dependence on is shown in Figure 3. We see that declines rapidly to a minimum as increases just beyond the value required to bring below 1. The optimal occurs when is about 0.8 and the gradual increase in for larger values of indicates that nothing is gained by striving to achieve a value of smaller than 0.8. Figure 3 illustrates that this conclusion is not sensitive to our assumed value of .

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Figure 3. Doses used per imported case.

Mean number of doses used to contain each outbreak initiated by one infected arrival, when doses are dispensed for every case.

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The encouraging conclusion that a relatively small stockpile of antiviral drugs is needed for an attempt to contain the pandemic locally is not a consequence of the specific model (1). The same conclusion is reached from branching process models under quite general assumptions about characteristics of transmission and disease progression.

The enormous benefit of local containment of a pandemic virus strain can be realised only when (i) antiviral drugs are effective enough to reduce the reproduction number from its initial value of to a value below 1, and (ii) timely distribution of antiviral drugs to appropriate individuals is possible in practice. In retrospect, pandemic H1N1 influenza in 2009 seemed to satisfy condition (i), but condition (ii) was not realised. We now consider some possible reasons for the failure to distribute antiviral drugs effectively.

Distributing antiviral drugs to affected households

Consider now transmission through a community of households. Suppose that every infection that an individual generates outside their own household is of a randomly selected community member. During the containment phase of the pandemic, the force of infection acting on a susceptible from outside the household is negligible relative to the force of infection exerted by an infectious household member. Using this we can show that, in a community of households, the number of doses of antiviral drugs dispensed per community member is(5)where is the mean number of antiviral doses dispensed to the household of a newly-infected individual who is selected randomly from the community and is the mean number of primary cases generated in the community by all the cases of a household outbreak initiated by a newly-infected individual who is selected randomly from the community. The derivation of (5) is outlined in Appendix S1. Equation (5) is the equivalent of (4) for a community of households. To be valid it requires, similarly to (4), that the reproduction number for infected households () is less than 1.

Equation (5) can accommodate a variety of strategies for dispensing antiviral doses to households, including “every household member” and “every household case upon onset of their symptoms”. From (5) we conclude, as for (4), that an attempt to contain transmission uses relatively few doses of antiviral drugs, be it sustained containment of transmission or an attempt to contain transmission that is abandoned once it becomes clear that containment is not feasible.

The key to containing transmission in a community of households lies in the ability to bring below 1. We now take a closer look at what is required to bring below 1, under the assumption that the effectiveness of antiviral drugs for reducing susceptibility and infectivity for the emerged virus strain is as estimated for currently circulating influenza strains. The effect of antivirals on reducing transmission is modeled as in Glass and Becker [25].

To show the roles of within and between household transmission we display results in terms of , the mean number of individuals an infective infects outside their household, and , the probability that a susceptible household partner avoids infectious contact with a household case during the latter's infectious period. These interpretations of and apply for a totally susceptible community in which antiviral drugs are not used. The curves in Figure 4 display values of and for which in three scenarios, namely (a) antivirals are dispensed at onset of symptoms in the primary case (two days after infection), (b) antivirals are dispensed two days after onset of symptoms in the primary household case, [2], [4] and (c) no antiviral drugs are dispensed. For each curve in Figure 4, parameter pairs that lie below the curve satisfy , while for parameter coordinates above the curve. By comparing the two lowest curves we see that dispensing drugs to all family members two days after onset of symptoms in the primary case expands the set of parameter values for which only a little. In contrast, dispensing drugs at onset of symptoms in the primary case expands the set of parameter values for which substantially. In other words, the set of scenarios for which containment becomes feasible is much larger when antiviral drugs are dispensed as soon as possible. When we compute values of for parameter pairs lying on curve (a) but assuming that no antiviral drugs are dispensed we obtain values in the range 1.9–2.7. This shows that antiviral drugs can bring a reproduction number that is well above 1 down to a value of 1 if they are dispensed at onset of symptoms in the primary case.

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Figure 4. Curves for which the reproduction number for household outbreaks (R_H) equals 1.

The three curves correspond to (a) antivirals are dispensed at onset of symptoms in the primary household case, (b) antivirals are dispensed two days after symptom onset in the primary case, and (c) no antiviral drugs are dispensed. For each of these three intervention scenarios, for every parameter point that lies below the curve and when lies above the curve.

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Timely dispensing of antiviral drugs is so important because, as reflected in the model, individuals infected with influenza become infectious prior to onset of symptoms and the bulk of their total infection potential has passed 2–3 days after symptom onset.

Failure to present

Figure 4 illustrates that failure to present early can reduce the effectiveness of using antiviral drugs to mitigate transmission. People might fail to present because their clinical symptoms are not severe or present late due to delayed access to health services. It seems likely that use of antiviral drugs to contain transmission of pandemic H1N1 influenza in 2009 was not successful because the fraction of infected individuals who failed to present, or presented late, was too high. It is useful to have a way of determining how the fraction of primary household cases who do not present, or present late, limits the chance of containing transmission.

Let denote the proportion of primary household cases that fail to present early. Under the assumption that every member of a household whose primary case presents early receives a dose of antiviral drugs and that other households get no antiviral drugs the reproduction number for infected households becomes , where is the household reproduction number when no antiviral drugs are dispensed and is the household reproduction number when antiviral drugs are dispensed to all infected households. This reproduction number is equal to 1 when(6)Therefore, even when , it is not possible to contain transmission if the proportion primary household cases who fail to present early is greater than the right hand side of (6).

Figure 5 shows the curves (6) for the values and for various values of that might be obtained when antiviral drugs are dispensed to members of those households where the primary case presents early. For values of below the curve it is possible to contain transmission, but for values of above the curve it is not. Suppose we can reduce the reproduction number for household outbreaks to when antiviral drugs are dispensed to all infected households. Then containment of transmission requires that less than 29% of primary cases fail to present early when , and less than 12% when .

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Figure 5. How the possibility to contain transmission depends on the proportion who fail to present early.

Transmission can be contained for values of below the curve, where is the proportion of primary household cases who fail to present early, is the household reproduction number when all infected households receive antiviral drugs and the household reproduction number without antiviral drugs is for curve (a) and for curve (b).

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Are antiviral drugs effective against the newly emerged virus strain?

The motivation to create a stockpile of antiviral drugs is based on their demonstrated effectiveness against currently circulating influenza strains. There is no guarantee that these drugs will be equally effective, or even effective at all, against a newly emerged pandemic strain of influenza. Informed decisions about the use of antiviral drugs in a pandemic require effectiveness for reducing transmission to be established from incidence data collected early in a pandemic. In preparation we need to know what data, and how much, are required to establish effectiveness. Glass and Becker [25] consider this question by estimating two specific parameters, one quantifying the effect on susceptibility and the other the effect on infectivity. Here we look at establishing effectiveness by comparing mean outbreak size in households that receive antiviral drugs early and households that receive them late. We have to allow for different household sizes. Households of size one provide no information for our comparison and we restrict attention to households of sizes two, three and four. The Australian census data indicate that the relative frequency of households of size 2, 3 and 4 is about 50%, 25% and 25%. Allowing for size-biased sampling we expect to observe roughly an equal number of outbreaks in households of size 2, 3 and 4. Accordingly, we assume that we observe outbreaks in households that receive antiviral drugs at onset of symptoms in the primary household case in households of size 2, 3 and 4, making households. In addition, we assume that we observe outbreaks in households that receive antiviral drugs late (two days after the onset of symptoms in the primary case) in households of size 2, 3 and 4, giving observations on another household outbreaks.

An Alexander-Govern test statistic [28] is computed for the comparison in households of a given size and values of these three test statistics are then summed and the null hypothesis of no effect is rejected if the sum exceeds the percentile of the distribution with three degrees of freedom.

The power curve corresponding to a given antiviral effect scenario was estimated by simulating 500 data sets, applying the test to each data set and noting the fraction that reject the hypothesis of equal mean outbreak sizes. Figure 6 shows the estimated power curves for four antiviral effect scenarios similar to the ones considered by Glass and Becker [25], which enables a comparison of results and illustrates the findings. These scenarios are motivated by data on antiviral effects for currently circulating influenza strains, [25]. In the simulations we used for the probability that an individual avoids being infected by a given household infective, in the absence of antiviral drugs.

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Figure 6. Power of a test to determine whether antiviral drugs are effective.

Power of a test to compare the mean outbreak size in households who receive antiviral drugs early and households who do not, for each of the household sizes 2, 3 and 4 (i.e. observations on household outbreaks). A modified version of the Alexander-Govern test is used and power is estimated by applying the test to each of 500 data sets for each and each effect scenario. In curves (a), (b) and (c) the simulations assume that antiviral drugs partially reduce infectivity and their effect on susceptibility is to induce full, partial and zero protection, respectively. Simulations for curve (d) assume no effect on infectivity and a partial effect on susceptibility.

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The antiviral effect on susceptibility is to reduce the probability of transmission of an infection occurring during a contact by a factor for a susceptible who is on antiviral drugs at the time. The effect on infectivity depends on the time when the infective starts taking the antiviral drug and is measured by the factor by which the area under the infectiousness function is reduced (i.e. the potential to infect others is reduced). Let denote the factor by which the area under the infectiousness function is reduced when the individual commences taking the drug at onset of symptoms. The curves (a), (b) and (c) of Figure 6 show the power as varies for the effect scenario with and , 0.5 and 1, respectively. Each point on the curve is obtained by simulating 500 data sets and observing the fraction that reject the no-effect hypothesis when our modified Alexander-Govern test is used. Curve (d) assumes the effect scenario with , no effect on infectivity, and , partial effect on susceptibility.

When considering the results in Figure 6 it is useful to keep in mind that monitoring infected households for cases is labour-intensive. In practice, monitoring more than 300 household outbreaks during the busy early stages of a pandemic would be very challenging. We would therefore like , the total number of household outbreaks monitored, to be less than 300. Let us take a power of 80% as a minimum requirement. Inspecting curves (a), (b) and (c), which are generated by including a common effect on infectivity, illustrates that observations on household outbreaks has a power of at least 80% of detecting an antiviral effect if there is also a moderate effect on susceptibility, but many more households are needed if susceptibility is not reduced. Comparing curves (b) and (d), which are generated by including a moderate effect on susceptibility, illustrates that a total of household outbreaks are needed to detect an effect if there is also a moderate effect on infectivity, but many more households are needed if the effect on infectivity is weak.

The hope that a direct comparison of mean outbreak size for households would require less data than a comparison based on specific parameters, as in [25], was not realised. The two approaches indicate approximately the same data needs. However, it is reassuring that a simple test based on minimal assumptions about the nature of transmission in the community can detect an antiviral effect with about the same amount of data.