Defining revaccination

We define the rate of revaccination (r) as the proportion of vaccine recipients in one influenza season who are also vaccinated in the following season. The revaccination rate is easiest to conceptualize if populations are closed and the level of vaccine coverage is constant across both seasons. Under those conditions, as vaccine coverage approaches 100%, the revaccination rate also converges to 100%. However, if the overall vaccination coverage is ⩽50%, the range of theoretically possible revaccination rates is 0–100%. If vaccination were random with respect to previous vaccination status, the expected revaccination rate would be equal to the vaccination coverage. To account for this, we additionally define r’ to be the excess revaccination rate, which measures revaccination beyond what is expected at random conditional on the coverage level,

$${r^{\prime} = \displaystyle{{r - C} \over {{\rm 1} - C}}}$$

where r is the absolute rate of revaccination and C is the vaccine coverage. For almost all of our analyses we will simply use r, because vaccination coverage will be held constant; the excess revaccination rate is used only for empirical estimation of revaccination.

Population model

We simulated epidemics on computationally generated contact networks. Computationally generated theoretical networks allow us to systematically study the epidemiological consequences of network structure. The network structure used in this study is an exponential random network, with the number of contacts per individual (i.e. degree) sampled from a geometric distribution, and connected randomly. We assume an average degree of 10 contacts per individual and a network size of 5000 nodes. (The impact of these choices is studied in the sensitivity analyses.) Bansal et al. [Reference Bansal, Grenfell and Meyers34] found that contact networks derived from empirical data correspond more closely to exponential random network structures than other common network types.

Epidemiological two-season model and vaccination

We model first-season vaccination with single doses of influenza vaccine by removing select individuals from the network. Individuals to be vaccinated are chosen randomly, and the size of the population to be vaccinated (and thus fully protected against influenza) is C*E, where C is the vaccine coverage rate, and E is the vaccine efficacy. We call the set of individuals who are vaccinated in the first season, V ₁, and note that these individuals are only protected for the first season (as influenza vaccine-induced immunity is temporary).

To model the first-season outbreak, we perform Monte Carlo simulations for a susceptible–infected–recovered (SIR) epidemic model with a single initial infected case and per-contact transmissibility, T ₁, on all susceptible individuals in the networks specified above. Once infected, a node cannot be reinfected during the same season, and unlike with vaccination, will have resistance to infection during the subsequent season (natural immunity). This is a reasonable assumption because natural immunity is thought to induce a stronger, longer lasting immune response than vaccines, and provide better cross-protection across strains [Reference Ohmit12, Reference Couch and Kasel35–Reference Belongia39].

Second-season vaccination is modelled similarly, except the identity of vaccinated individuals is no longer completely random. Based on the revaccination rate, r, a proportion r of the vaccinated group (V ₁) is vaccinated first. The remaining vaccine supply (C – rV ₁) is distributed randomly in the rest of the population.

The second-season outbreak is also modelled with a Monte Carlo SIR model, and an independent transmissibility T ₂. In our simulations, T ₂ is chosen to be greater than T ₁ to ensure a comparable R ₀ across both seasons (as R ₀ is a function of both transmission probability and contact structure in this framework).

Infection in the second season is allowed in all susceptible individuals (that is, those individuals who do not have natural immunity from the first season and those who have not been vaccinated immediately prior to the second season). Second-season outbreaks are only considered in cases when a large epidemic occurs in the first season. The model assumes constant demography and constant network structure over the course of the two seasons. Public health burden is measured in terms of the proportion of the population infected in the event that there is a large epidemic in the second season.

Universal vs. preferential vaccination

To consider the effect of susceptible population size on revaccination, we consider two models of second-season vaccination. One model – universal vaccination – follows the method outlined in the previous section, in which vaccine doses not used for revaccination are randomly administered to any individuals not vaccinated for the first season, including both naturally immune and never vaccinated or infected individuals. An alternative model – preferential vaccination – still implements revaccination as before, but the remaining doses are administered to individuals without natural immunity from the first season. (While this approach may not be realistic as individuals who are infected with influenza in a previous season might be more motivated to be vaccinated in a subsequent season, it provides a useful model for comparison.) When revaccination is complete (r = 100%), no individuals are vaccinated for the first time prior to the second season and, as such, the two models are functionally identical. Figure 3a confirms that under the preferential vaccination scenario, the proportion of all individuals who are susceptible prior to the second season does not change even as the revaccination rate changes. This is as expected, because under the preferential vaccination scenario, the number of susceptible individuals is simply the total number of individuals in the network minus the number of individuals with natural immunity from the first season and minus the number of individuals vaccinated for the second season.

Realistic parameters

In the robustness analysis on the Vancouver urban network [Reference Bansal25, Reference Meyers29], we divide the population into four age groups (0–4, 5–18, 19–64, ⩾65 years). The vaccine efficacies for each of these age groups were 60%, 60%, 70%, and 50%, respectively, and were primarily based on clinical trials of influenza vaccines and meta-analyses thereof [Reference Osterholm3, Reference Govaert40–Reference Jackson46]. We assume that vaccine efficacy in the second season is independent of first-season vaccination status. We also implement two vaccine-coverage scenarios. For a scenario based on the 2011/2012 influenza season in the United States, the age-specific vaccine coverage levels are 55%, 45%, 40%, and 70%, respectively [47]; for a scenario based on coverage levels from 2006 in the United States, age-specific vaccine coverage levels are 33%, 16%, 21%, and 65%, respectively [48, 49]. Revaccination rates are applied to each age group such that the excess revaccination is equal across age groups (i.e. differences in vaccine coverage are taken into account). While the relationship between immune response and future protection is not well quantified, the efficacy of natural immunity, Q, for all age groups is assumed to be 80% [Reference Couch and Kasel35, Reference Cowling38, Reference Cox, Brokstady and Ograz50, Reference Gill and Murphy51]. In this case, natural immunity is implemented in a manner similar to vaccination, so that 80% of those infected in the first season are assumed to be fully protected against infection, while the remaining 20% are not protected at all.

We reviewed the literature for empirical rates of revaccinations. Rates likely vary between populations, perhaps depending on factors such as access to vaccines and the overall rate of vaccination in the population. Data from a study of Medicare beneficiaries [Reference Xakellis32] indicates a revaccination rate of 93·4% between the 1998/1999 and 1999/2000 influenza seasons with a 70% vaccine coverage rate; while Uddin et al. [Reference Uddin52] surveyed college students and found a revaccination rate between the 2006/2007 and 2007/2008 seasons of 58·5% with an average coverage rate of 15·65%. Last, based on data reported in a large study of people aged ⩾65 years in the Netherlands, we estimated rates of revaccination generally between 80% and 90% [Reference Voordouw15].

The methods for the sensitivity analyses are described in the Supplementary material.