Description of spatiotemporal patterns of RSV

Hospitalizations for RSV were strongly seasonal, with annual epidemics occurring during the winter months in most states (Fig. 1A, S1 Fig.). Some states (e.g. Colorado, Iowa, California in the 1990s) exhibited biennial patterns of alternating “early-big” epidemics in/around January of even-numbered years and “late-small” epidemics in/around February of odd-numbered years. The peak in RSV hospitalizations was notably earlier in Florida (occurring in November/December) compared to the other states, and hospitalizations occurred throughout the year (Fig. 1A). The vast majority (>97%) of RSV-coded hospitalizations occurred among children <5 years of age, and ∼75% occurred among children <1 year of age. The age distribution of cases varied slightly by state (Fig. 1B).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 1. Patterns of RSV activity across the United States for hospitalization and laboratory testing data.

(A) Time series of weekly RSV hospitalizations in select states. Raw hospitalization data is shown in blue, while the rescaled data accounting for the addition of an RSV-specific ICD-9 code in September 1996 is shown in green. (B) Age distribution of RSV hospitalizations across ten states. (C) Center of gravity of RSV activity in states with at least ten consecutive years of laboratory reports. (D) Strength of biennial cycle in RSV activity, as indicated by the ratio of the biennial to annual Fourier amplitude for laboratory report data.

https://doi.org/10.1371/journal.ppat.1004591.g001

Laboratory reports of RSV-positive specimens exhibited a distinct spatial pattern, with mean timing of RSV activity (as indicated by center of gravity, a measure of mean epidemic week (S1 Text) [36]) occurring earliest in Florida and latest in Montana (Fig. 1C). Again, some states exhibited a biennial pattern of RSV epidemics; these states were highly concentrated in the upper Midwest and West regions (Fig. 1D). The laboratory and hospitalization data were highly correlated for those states with both types of data available (r>0.71, p<0.0001, S1 Table).

Linking environmental drivers and timing of RSV activity

We explored trends between a variety of climatic and non-climatic variables and timing of RSV activity across US states, as measured by both center of gravity and phase difference with Florida (Table 1 and S2 Table, S2 Fig.). Negative associations were found with annual mean vapor pressure, temperature, precipitation, and potential evapotranspiration (PET), and were generally stronger when considering the mean value for the fall months (September-November) for each climatic factor. Population size and latitude were also associated with RSV timing (Table 1). Fall vapor pressure had the highest explanatory power (R² = 72–76%), and was also the only significant factor in an exploratory multivariate analysis (p<0.0001) (S3 Table). Note that while these analyses may be indicative of statistical trends, they do not account for the intrinsic nonlinear epidemic dynamics of RSV.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 1. Univariate regression of timing of RSV activity in 50 US states and District of Columbia, 1989–2010, against monthly climatic, population and geographic indicators.

https://doi.org/10.1371/journal.ppat.1004591.t001

Dynamic modeling analyses

Mathematical modeling of the transmission dynamics of RSV allows us to explore the mechanistic relationship between the potentially important environmental variables and seasonal variation in the transmission rate, via which the environmental variables would likely act to affect the incidence of RSV [30]. We developed an age-stratified SIRS (Susceptible-Infectious-Recovered-Susceptible) model for the transmission dynamics of RSV, accounting for repeat infections and using natural history parameters derived from RSV cohort studies (Table 2). The model was able to reproduce the age distribution (χ²<0.17, p<0.005) and seasonal pattern of RSV hospitalizations in ten states (correlation between observed and predicted annual center of gravity: r = 0.87, p<0.005) (Fig. 2, S1 Fig.). Notably, the model was able to reproduce the biennial pattern of epidemics evident in some states even though we assume that the transmission rate of RSV follows the same seasonal pattern every year. Furthermore, the model was able to replicate the transition from biennial epidemics during the 1990s to annual epidemics during the 2000s that occurred in California, possibly due to changes in the birth rate.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 2. Transmission dynamic model for RSV and fit to age-specific hospitalization data.

(A) Compartmental diagram illustrating the structure of the model. White boxes represent infection states in the model, while grey boxes represent diseased/observed states (severe lower respiratory disease, D, and observed cases, H). (B) Model fit to weekly RSV hospitalization data for California and Florida. The ICD9-CM coded hospitalization data is shown in blue, the rescaled data is shown in green, and the fitted models are shown in red. (C) Age distribution of RSV hospitalizations in California and Florida for hospitalization data and fitted models.

https://doi.org/10.1371/journal.ppat.1004591.g002

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 2. Transmission dynamic model parameters.

https://doi.org/10.1371/journal.ppat.1004591.t002

From the best-fitting model to the aggregate data from the nine states with complete age-stratified hospitalization time series from 1989–2009, we estimated the relative infectiousness of third and subsequent infections compared to first two infections to be 0.51 (Table 2). The mean value of R₀ was estimated to be 8.9, but we observed state-specific variation in R₀ (with estimated values between 8.9 and 9.2), which was significantly correlated with population density (r = 0.77, p<0.01) (S3 Fig.). The estimated hospitalized fraction (h) also varied among states (from 3.2% in California to 6.9% in Colorado), but was not significantly correlated with population size or density, nor were estimates of R₀ and h significantly correlated with one another (S4 Table). Our estimates of the hospitalized fraction are similar albeit slightly lower than the 7–8% of infants with lower respiratory tract infections who were hospitalized during cohort studies conducted in the US and Kenya [37], [38]; this is not surprising given one US-based study noted that only 45% of RSV-positive inpatients received an RSV-associated diagnosis [39].

The amplitude and timing of sinusoidal seasonal variation in the transmission rate estimated by fitting the model to the hospitalization data were both negatively correlated with mean vapor pressure and mean precipitation (p<0.01), and positively correlated with the amplitude and timing of PET in each state (p<0.01) (Table 3). The seasonal offset parameter (illustrating timing of peak transmissibility) was also significantly correlated with mean minimum temperature (p<0.01). These parameter estimates were also positively correlated (p<0.001) (S4 Table).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 3. Correlation coefficients between climatic variables and estimated seasonality parameters in RSV transmission model.

https://doi.org/10.1371/journal.ppat.1004591.t003

Fitting our model to the laboratory surveillance data for RSV allowed for a more extensive analysis of the relationship between state-specific climate indicators and the amplitude and timing of seasonal variability in the transmission rate across a large number of states with different climates. Since the laboratory data did not contain the age of cases, we estimated R₀ for each state based on the observed relationship between R₀ and population density prior to fitting the model.

Again, we found significant negative correlations between the amplitude and peak timing of RSV seasonal forcing (i.e. seasonality in the transmission rate) and the mean vapor pressure, minimum temperature, and precipitation across the 38 states (p<0.0001) (Table 3, Fig. 3A-C), i.e. warmer, wetter states tended to exhibit less seasonal variation and an earlier peak in the transmission rate of RSV than cooler, drier states. We also found a weaker but still significant positive correlation between the amplitude of seasonal forcing and the amplitude of variation in minimum temperature (p<0.005). Estimates for peak RSV transmissibility, however, were not correlated with the timing of the seasonal trough in minimum temperature or vapor pressure (Table 3). A strong and significant positive correlation was observed between both the amplitude and peak timing of RSV seasonal forcing and the seasonal variation in PET (p<0.0001) (Table 3, Fig. 3D). However, the state-to-state variability in the timing of peak RSV transmissibility was more than twice the observed variability in the timing of PET troughs (Fig. 3D).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 3. Relationship between estimated seasonality parameters for model fit to laboratory report data and select climatic factors.

The estimated amplitude of seasonal forcing in RSV transmission (top) and the estimated seasonal offset parameter (bottom: φ = 0 represents January 1 and φ = −0.2 represents October 19) is plotted against (A) annual mean vapor pressure (hecta-Pascals), (B) annual mean minimum temperature (°C), (C) annual mean precipitation (mm/month), and (D) amplitude (relative to the annual mean) and timing of trough in potential evapotranspiration (PET; 0 = January 1, 0.1 = February 6). The colorbar on the right indicates the ratio of the biennial to annual Fourier amplitude for the observed data (outer circle) and fitted model (inner diamond). Select states are labeled: Arizona (AZ), Florida (FL), Georgia (GA), Hawaii (HI), Louisiana (LA), Montana (MT), New York (NY), South Dakota (SD), Texas (TX), Wyoming (WY).

https://doi.org/10.1371/journal.ppat.1004591.g003

The model was again able to capture the biennial pattern of RSV epidemics apparent in some states. The correlation between the observed and predicted ratio of the biennial to annual periodicities, as estimated by Fourier analysis, was 0.89 (p<0.0005). States with biennial RSV dynamics tended to have strong seasonal forcing (b>0.25), which was associated with a large amplitude of variation in PET and low minimum temperature, vapor pressure, and precipitation (Fig. 3). In general, the ratio of the biennial to annual Fourier amplitude was slightly greater in the data than predicted by the models; this is likely due to random year-to-year variability in the size of RSV epidemics, which is not accounted for in our deterministic models.

It was not possible to explain unusually high or low RSV activity within a given state, apart from the regular biennial patterns, based on any of the climatic variables. Deviations from model-predicted patterns (observed minus predicted monthly RSV lab reports) were not significantly correlated with temperature, vapor pressure, precipitation, or PET (p>0.05) (S4 Fig.). Furthermore, we were not able to explain year-to-year variation in epidemic timing and size by directly parameterizing variation in the transmission rate based on weekly variations in PET (S1 Text). Such a model also provided a poor fit to the data, as indicated by the log-likelihood (S5 Table).

Impact of climatic drivers on RSV

A number of studies have examined the statistical association between climatic factors and RSV seasonality. Most studies have found a significant association between temperature and RSV activity using time series correlation; however, the direction of the association is not consistent across studies, and such studies do not control for the temporal dependence among observations. RSV activity tends to occur in the coldest months in temperate regions where winter outbreaks are common [6], [13], [18]–[20], [22], [42] and in the warmest months in subtropical and tropical climates [16], [25]. Low absolute humidity (proportional to vapor pressure) has been found to be an important correlate of RSV activity in Spain [20]. Yusuf et al. [25] also observed significant correlations between dew point (a measure of absolute humidity) and RSV activity across nine cities worldwide, but again the association was negative in temperate locations and positive in subtropical locales. Paynter et al. [30] used a mathematical model to show that seasonality in the transmission rate of RSV followed a similar pattern to rainfall in the Philippines. Accordingly, the peak in RSV activity coincides with the rainy season in a number of tropical locations [15], [43]. It may be that both colder temperatures and rain cause people to aggregate indoors, thereby facilitating RSV transmission [6], [44]. More studies are needed to tease apart the associations between climate, human behavior, and infectious disease transmission. Interestingly, our study is the first to explore the association between PET and RSV dynamics.

Our US analysis indicates that mean vapor pressure, minimum temperature, precipitation, and seasonal variation in PET are good candidates to explain the timing of RSV activity across different states in the US. However, states with higher minimum fall temperature and vapor pressure tend to experience earlier RSV activity, which is difficult to reconcile with the broad seasonal patterns of this pathogen, which predominates in winter in temperate regions. Furthermore, the estimated seasonal offset parameters (i.e. timing of peak transmission) did not correspond well with the timing of the seasonal trough in temperature and vapor pressure across states. In contrast, the association between RSV and PET is more consistent, as states with lower seasonal variation in PET, lower average PET, and earlier wintertime PET troughs tend to experience earlier and less strongly seasonal RSV epidemics (Florida being the most extreme example). However, as most climatic variables are typically highly correlated, it is difficult to pinpoint a single driver of RSV dynamics with great certainty. Climate variables may be a proxy for something else that affects transmission, or there may be a more complex relationship between climate and RSV transmission (e.g. non-linear or threshold effects). Furthermore, most climatic conditions (including PET) will vary between indoor and outdoor environments. Additional analyses using similar methodological approaches in different geographic settings and at different geographic scales may be able to further disentangle the effect of various climatic factors.

It is possible that the influence of climatic factors on RSV seasonality may be modulated by other important factors that affect the RSV transmission. Demographic factors such as population density and crowding indices have been shown to be associated with the length of the RSV season across different parts of Colorado [45]. Birth rates have been shown to be an important driver of the spatiotemporal pattern of rotavirus epidemics in the United States [36], but do not appear to be correlated with the timing of RSV epidemics. Changes in the birth rate in California (which tended to be larger than within other states) may help to explain why epidemics in this state transitioned from biennial during the 1990s to annual during the 2000s; however, more work is needed to understand how variation in birth rates and transmission rates may impact RSV dynamics. Increased contact rates among older siblings during school terms have also been hypothesized to play an important role in determining RSV seasonality [13], [46], and have been shown to play in important role for other respiratory infections [47]–[49]. However, we found that incorporating school-term forcing did not improve the fit of our model to the data (S1 Text, S6 Table). By modeling the transmission dynamics of RSV, we are able to account for how these factors may interact with other sources of seasonal forcing, such as climatic factors, while controlling for the temporal dependence in the data.

Relationship to previous mathematical models for RSV

Our findings are similar to those of other dynamic models of RSV. White et al. [27] and Weber et al. [29] found that the estimated amplitude of seasonal forcing was generally greater for temperate locations and could explain the biennial pattern of RSV epidemics in Turku, Finland. These biennial epidemic patterns, in particular, cannot be explained by statistical associations alone; they result from the dynamic feedback that occurs when an annual seasonal forcing leads to an “overshooting” of the susceptible population in the big epidemic years, leaving fewer susceptible individuals who can be infected the following year. We build on these previous analyses by fitting our model to a large number of states with different climates. As such, we are able to correlate differences in the estimated seasonal forcing parameters for various states to climatological differences. Our estimates of the amplitude of seasonal forcing are greater than those of the best-fit model of White et al. [27], but similar to those of Weber et al. for Florida and sites that exhibit biennial epidemics (e.g. Montana and Finland) [29].

Fitting our model to the age-specific hospitalization data gave us more power to estimate R₀ compared to previous dynamic models, which were fit to data aggregated across age groups. Our estimates of R₀ = 8.9–9.2 were similar to those obtained by White et al. (2007) for their best-fitting model, and were slightly higher than those obtained by Weber et al. (2001) for a similar model structure. Any discrepancies can likely be explained by differences in parameter assumptions. For example, unlike Weber et al. (2001), we assume a decrease in the duration of infectiousness and severity of repeated infections. This relatively high value of R₀ suggests that controlling RSV transmission will require substantial effort.

Climate change, in particular an increase in average annual temperature, has been hypothesized to be responsible for shortening the RSV season in England [17]. However, a shift towards earlier RSV epidemics has also been observed in São Paulo, Brazil, which cannot be attributed to changes in climate [13]. A similar shift towards later epidemics has been noted elsewhere [45]. We also observed some changes in the timing of RSV activity in the US, mostly towards earlier RSV activity, but these patterns do not appear to be linked to climate trends (S7 Table).

Caveats and future directions

An important limitation of our analyses is that we did not have data on the genetic strains of RSV causing cases over time and among different states. Therefore, we did not explicitly model the interaction of RSV types A and B, which White et al. (2005) found could help explain differences in the transmission dynamics of RSV in England and Wales and Turku, Finland. It is possible that strain cycling may help to explain between-year deviations from model-predicted epidemic patterns, for which we did not find any correlation with climatic factors (S4 Fig.). However, the interaction among different subtypes of RSV is unlikely to be the main driver of differences in the seasonality and periodicity of RSV activity among different states. In cities with biennial RSV activity, a single subtype has been observed to predominate for two years (i.e. through both an early-big and late-small season) prior to being replaced by the other subtype [50]–[52]. Furthermore, no association was observed between subtype predominance and epidemic severity and timing over 15 years in one US city [53].

Another limitation is that we assumed age-specific population mixing patterns were equivalent to those in the Netherlands [54], since no such broadly based studies have been conducted in the United States. Population mixing patterns were broadly similar across a variety of European countries [55], and are likely to be similar in the United States. However, the Netherlands appears to have slightly higher contact rates among 0–4 year olds compared to other countries such as the United Kingdom [54], [56]. This may have influenced our estimates of R₀, as well as limited the potential impact of school-term forcing in helping to explain the spatiotemporal pattern (S1 Text). Similar studies of population mixing, and how such patterns vary seasonally, should be conducted in the United States. Also, the lack of age detail in the laboratory report data limited our ability to directly estimate R₀ for all states included in the analysis.

Finally, our epidemiological datasets were prone to changes in reporting and coding practices, and these datasets captured only a fraction of all RSV infections. We elected to use very specific RSV outcomes to have an accurate picture of the age distribution of RSV cases, and addressed sensitivity issues by rescaling the data to remove time trends and incorporating an estimated reporting rate in our transmission model. Importantly, sensitivity analyses indicate that our results are robust to the rescaling method and that RSV-specific hospital admissions align well with broader outcomes such as bronchiolitis (S8 Table, S6–S7 Fig.).

One potential hypothesis that follows from this study, which may help to explain why RSV activity in the US begins in Florida (particularly southeastern Florida [9]), is that less variable climatic conditions in Florida combined with high population density in cities such as Miami allows for year-round persistence of RSV. In contrast, other states may experience routine fadeouts of RSV infection during the summer months. If this were the case, then peak RSV activity in Florida could begin as soon as climatic conditions (and population mixing) favored a slight increase in transmissibility of the virus, whereas other states may be dependent on outside introduction of the virus once the effective reproductive number (R_e = R₀ x the proportion susceptible) is greater than 1. Indeed, White et al. (2007) observed frequent fadeouts of infection in a stochastic version of their best-fitting model, particularly in temperate settings. The role of fadeouts in the spatiotemporal dynamics of RSV could be explored using a stochastic metapopulation model informed by local rather than state-aggregate data, which is an important direction for future research. The availability of detailed data and large variability in climate make the United States a very useful test case for this. Further, it would be interesting to compare the results with Europe, where strain typing has also been performed. Finally, a more detailed understanding of the spatial transmission of this disease could be obtained by fitting phylogeographic models to large-scale viral sequencing data [57]. Such models were instrumental in elucidating the migration patterns of the influenza virus over the past decade [58], but require a large amount of well-sampled molecular data, which are not yet available for RSV.

We have been able to demonstrate that mean vapor pressure, temperature, and precipitation as well as seasonal fluctuations in PET are correlated with seasonal variation in the transmission rate of RSV; these factors could help to explain differences in the strength of RSV seasonality across the different regions of the United States. Stronger seasonal forcing can also drive the occurrence of biennial patterns of RSV activity. However, the rationale behind why RSV epidemics tend to begin in the southeastern United States remains elusive. Our analysis highlights the role of potential evapotranspiration as a previously unidentified correlate of RSV transmission. A better understanding of the relationship between PET and RSV survival may help predict the timing of RSV activity across the United States and further guide the optimal timing of prophylaxis. More importantly, a more detailed mechanistic understanding of RSV transmission dynamics will be crucial to help predict the impact of RSV vaccination programs, as vaccine candidates are currently undergoing clinical trials.

Data sources

We examined the spatiotemporal pattern of RSV activity in the United States using two sources of weekly epidemiological data: (1) age-specific hospitalizations with any mention of RSV from ten State Inpatient Databases (SIDs) of the Healthcare Cost and Utilization Project (HCUP), from January 1989 to December 2009 for nine states (Arizona, California, Colorado, Iowa, Massachusetts, Maryland, New Jersey, Washington, and Wisconsin) and from 1989–1996 and 2005–2009 for Florida, and (2) laboratory reporting of the number of RSV-positive tests (by any detection method) from the National Respiratory and Enteric Virus Surveillance System (NREVSS), for which 38 states had at least 10 consecutive years of consistent data between July 1989 and May 2010.

Exploratory analyses of putative environmental drivers

Summary measures describing the seasonal variation in temperature, PET, and vapor pressure, including the mean value, relative amplitude of seasonal fluctuations, and seasonal offset, were derived by fitting harmonic curves to the climatic time series (S5 Fig.). We also calculated mean monthly and weekly values for all climatic variables in each state, and used these to estimate deviations from the average state-specific climatology.

We obtained two complementary measures of RSV epidemic timing, based on the center of gravity (mean epidemic week, where each week is weighted by the number of cases—S1 Text, [36]) and phase decomposition obtained from wavelet analysis [40], [63]. In the wavelet analysis, we used the 0.8–1.2 year periodicity band from the wavelet spectrum to extract weekly phases, and calculated the difference between phase in Florida, where RSV epidemics are earliest, and phases in the other states, averaged throughout the study period.

Following earlier work [36], [64], we estimated the statistical association between empirical seasonal patterns of RSV and climate factors using univariate and stepwise multivariate regression models, with RSV timing as the outcome (center of gravity or phase difference with Florida), and climate variables as predictors. Monthly climate predictors were summarized as annual and seasonal means; since fall (September-November) climate values were most strongly associated with RSV, we do not report regression results for the other seasons here. We also considered demographic (birth rate, population size and density), geographic (latitude, longitude), and sampling (number of RSV tests) factors in multivariate regression models. Finally, time trends in climate and RSV seasonal characteristics were assessed by linear regression using year as a potential predictor.

Dynamic model description

We developed an age-structured SIRS model to describe the transmission dynamics of RSV (Fig. 2A). The model assumes individuals are born with protective maternal immunity (M), which wanes exponentially (with a mean duration of 3–4 months) [65], leaving the infant susceptible to infection (S_n, where n is the number of previous infections). Following infection with RSV, individuals develop partial immunity, which reduces the rate of subsequent infection and the duration and relative infectiousness of such infections, consistent with epidemiological studies and previous models of RSV transmission [26], [27], [29]. We assume a progressive build-up of immunity following one, two, and three or more previous infections (I_n) [37], [66]–[68]. Both age and number of previous infections were assumed to influence the risk of developing severe lower respiratory disease (D) possibly requiring hospitalization [37], [66], [69]. We parameterized the model based on data from cohort studies conducted in the US and Kenya (Table 2) [37], . Transmission-relevant contact patterns were assumed to be frequency-dependent and were parameterized based on self-reported data on the number and age of conversational partners from one European study [54], [55]; no such study has been conducted among a widely representative cohort in the US.

We initially fit our model to the age-stratified hospitalization data from all nine states with complete data from 1989–2009 in order to estimate the mean transmission rate, relative infectiousness of first and second versus subsequent infections, seasonality parameters, and reporting fraction (i.e. proportion of individuals with severe lower respiratory tract disease who are hospitalized, coded as RSV, and reported in our dataset), which are key unknown parameters. We then fixed the relative infectiousness and fit the model to the hospitalization data from each of the nine states plus Florida individually, using the other estimated parameters from the cumulative data fit as our starting conditions to estimate state-specific transmission rates, seasonality parameters, and reporting fractions. For each fit, we seeded the model with one infectious individual in each age group and used a burn-in period of 40 or 41 years, examining the fit using both even- and odd-year burn-in periods to allow for the biennial pattern of epidemics present in some states, and selected the best-fitting model for each state. We also explored longer burn-in periods and examined the model output to ensure that the equilibrium quasi-steady state had been reached.

Seasonality in the instantaneous rate of transmission of RSV was modeled using sinusoidal seasonal forcing with a period of 1 year (52.18 weeks) as follows: , where β₀ is the baseline transmission rate, b is the amplitude of seasonality, and φ is a seasonal offset parameter (a measure of timing of peak transmissibility), and t is the time (in years) [31], [32]. We constrained φ to be between −0.5 and 0.5, where φ = 0 represents January 1 and φ = −0.5 and φ = 0.5 both represent July 1. These parameters were estimated by fitting our model to the state-specific data.

We used maximum likelihood to determine the best-fitting models. For each set of parameters, the likelihood of the data given the model was calculated by assuming the number of hospitalizations in each age class (a) during each week (w), x_a,w, was Poisson-distributed with a mean equal to the model-predicted number of severe lower respiratory tract infections due to RSV (D_a,w) times the reporting (or hospitalized) fraction (h), , as has been described previously [27], [36]. The log-likelihood (log(L)) of the model was given by the equation:

While this observation model may fail to capture the true variability in the distribution of cases, other observation models (e.g. negative binomial) would require estimating an additional parameter, which we do not feel is justified. We used the “fminsearch” command in MATLAB v7.14 (MathWorks, Natick, MA) to minimize the –log(L), which employs a direct simplex search method.

Next, we fit the model to the laboratory data on RSV-positive tests from 38 states. The laboratory data did not contain detail on the age of cases; therefore, we could not derive reliable estimates of the baseline transmission rate by fitting our model to these data, since estimates of the baseline transmission rate and reporting fraction are inherently confounded. (The age distribution of cases, pattern of epidemics, and mean incidence rate inform estimates of the baseline transmission rate, while the mean incidence also informs estimates of the reporting fraction.) Instead, we estimated the baseline transmission rate for each state from the relationship we observed between population density and R₀ among the ten states with hospitalization data (S3 Fig.). We fixed the R₀ for the District of Columbia at the maximum observed R₀ (for New Jersey). We then estimated the amplitude of seasonality, seasonal offset parameter, and reporting fraction by fitting our model to the rescaled laboratory data. We examined the sensitivity of our results to the method we used to correct for changes in testing and reporting effort for RSV over time by also fitting our model to the raw number of RSV-positive tests reported, instead applying the estimated scaling factor to the model output (i.e. dividing the model output by the scaling factor for each week). The log-likelihoods of the fitted models were similar (S5 Table), and the results were qualitatively the same (S8 Table).

We examined the correlation between the estimated model parameters for each state and the significant climatic variables from the univariate statistical analyses. We calculated the Pearson's correlation coefficient and associated p-value for each state-specific parameter estimate and climatic variable of interest. We also examined the ability of the model to capture the biennial pattern of RSV epidemics present in some states by comparing the strength of the biennial cycle in the observed and predicted RSV time series. The strength of the biennial cycle was calculated as the ratio of the biennial to annual Fourier amplitude [73], [74]. Finally, we examined whether monthly deviations from average climatic conditions could help explain the difference between observed and predicted monthly RSV activity across states.