Estimating the time-varying reproduction number of SARS-CoV-2 using national and subnational case counts

Data

We use daily counts of confirmed cases reported by the European Centre for Disease Control for all analyses conducted at the national level^12,13. To estimate the delay from symptom onset to reporting (once confirmed with a positive laboratory test), we use all cases from a publicly available linelist for which onset and notification dates are available^13,14. This linelist combines all known linelist data from over 100 countries and at the time of writing has 4,132 entries with both an onset date and a notification date. Countries are only included in the reported estimates if at least 60 cases have been reported in a single day. This restriction reduces the likelihood of spurious estimates for countries with limited transmission or case ascertainment.

For sub-national analyses, the source of the data is reported on the respective page on our website. The data are fetched from government departments or from individuals who maintain a data source if no official data are available. Subnational entities within countries are only reported if at least 40 cases have been reported in a single day. A lower limit is possible for sub-national compared to national data due to more consistent case reporting in the source datasets.

All analyses described below are run independently for each national or subnational entity under consideration.

Adjusting for reporting delays

To estimate the reporting delay with appropriate uncertainty, we fit exponential and gamma distributions to 100 subsampled bootstraps (each with 250 samples drawn with replacement) of the delay between symptom onset and case notification, accounting for left and right censoring occurring in the data as each date is rounded to the nearest day and truncated to the maximum observed delay. We fit each model in the statistical modelling program stan (2.19.1)¹⁵ and compared to goodness-of-fit of each distribution to the data by comparing the approximate leave-one-out cross-validation information criterion (LOOIC)¹⁶.

The distribution that gave the lowest LOOIC was selected as the most appropriate and 10 samples of the fitted distribution parameters were then drawn per bootstrap (giving 1000 in total). For a given country, we used sample i from the posterior distribution of delay distribution parameters, Θ_i, to draw a sample of delays, d_i, to transform each observed notification date, c_i, into a sample onset date, o_i, as follows:

where d_i ∼ exp(Θ_i) or gamma(Θ_i)

This resulted in 1000 date of onset samples for each confirmed case. For countries/regions with high case loads (more than 10,000 reported cases) the sampling step is approximated using the probability density function of the reporting delay.

Adjusting for right-truncation of notification dates

When moving from notification dates to onset dates it is important to consider that the total number of confirmed cases lags behind the number of cases that have onset, since there is a delay between onset occurring and the case being counted upon notification. To account for this right truncation, we used binomial upscaling to increase the estimated numbers of case onsets close to the present. After transforming the observed notification dates to onset dates and tallying case onset numbers by day, we then drew a sample of the number of case onsets that occurred but have not yet been confirmed.

If t is the last date on which cases were reported then the number of onsets on day t – j, denoted as o_t–j, is regarded as the result of a Bernoulli trial from the total true number of cases with symptom onsets on day t – j. o_t–j is then distributed according to a negative binomial distribution as follows:

where F(t – j, Θ_i)) is the cumulative distribution function for the given delay distribution. It gives the proportion of onset cases from t – j days ago that are expected to have been confirmed over the j days from that time until the present. The final numbers of case onsets that were used to estimate the time varying reproduction numbers for day t are consequently given by $o_t+o_t^{\ast }.$ As our approach could not fully reconstruct unreported cases without bias we truncated our results and did not use estimates from the last 3 days. To prevent spurious estimates we truncated the allowed amount of upscaling to be less than 10 times the reported cases on any given day.

Adjusting for the delay between onset and infection

We repeated the steps outlined above for adjusting for the delay from report to symptom onset to account for the delay between symptom onset and infection by replacing the bootstrapped report delay distribution with an incubation period distribution with a mean of 5 days¹⁷. Uncertainty from this distribution was proprogated through the model by sampling the distributions parameters assuming they were both normally distributed.

Estimating the time-varying reproduction number

We used the EpiEstim R package (2.2.1)^6,10,18,19 to fit a model that estimated the time-varying reproduction number from the daily number of infections and an uncertain generation time with a mean of 3.6 days (sd: 0.7 days) and a standard deviation of 3 days (sd: 0.8 days). The generation time estimate was derived using the data and method of²⁰ modified to use the incubation period from¹⁷. The instantaneous reproduction number represents the number of secondary cases arising from an individual showing symptoms at a particular time, assuming that conditions remain identical after that time, and is therefore a measure of the instantaneous transmissibility (in contrast to the case reproduction number - see Fraser (2007)⁸ for a full discussion). We used a gamma prior for the reproduction number with mean 2.6 and standard deviation 2. This is based on early estimates for the basic reproduction number (R₀) from the initial stages of the outbreak in Wuhan^21,22 with long tails to allow for differences in the reproduction number between countries. Our approach can also be used to account for imported cases where data is available⁷.

We incorporated uncertainty in the generation time distribution by providing EpiEstim with 1000 samples each derived using a different sample of the log mean and log standard deviation of the assumed log normal distribution. We evaluated the reproduction number by assuming that it is constant over a backwards looking sliding time window⁶. We evaluated window lengths from 1 to 7 days, running EpiEstim separately for each window choice. The optimal time-varying window was selected by first estimating the one day ahead number of cases implied by each time-varying reproduction number estimate²³ and then scoring this nowcast against the observed number of cases using the ranked probability score (RPS) score^24,25. For each sample the window with the lowest RPS score was selected at each time point.

The estimates of the time-varying reproduction number at each time point were combined over 1000 samples, using the optimal window for each, to give a credible interval that incorporates uncertainty from the delay from case onset to notification, the incubation period and the generation time.

Estimated change in daily cases

We defined the estimated change in daily cases to correspond to the proportion of reproduction number estimates for the current day that are below 1 (the value at which an outbreak is in decline). It was assumed that if less than 5% of samples were subcritical then an increase in cases was definite, if less than 20% of samples were subcritical then an increase in cases was likely, if more than 80% of samples were subcritical then a decrease in cases was likely and if more than 95% of samples were subcritical then a decrease in cases was definite. For countries/regions with between 20% and 80% of samples being subcritical we could not make a statement about the likely change in cases (defined as unsure).

As another metric of outbreak progression, we estimated the rate of spread (r) using a quasipoisson regression model²⁶. The R² value of the regression fit was then used to assess the goodness-of-fit. In order to account for potential changes in the rate of spread over the course of the outbreak we used a 7-day sliding window to produce time-varying estimates of the rate of spread and the corresponding R². The doubling time was then estimated by calculating ln$\left(2\right)\frac{1}{r}$ for each estimate of the rate of spread.

The effect of changes in testing procedure

The results presented here are sensitive to changes in COVID-19 testing practices and the level of effort put into detecting COVID-19 cases, e.g. through contact tracing. For example, if numbers of incident infections remain constant but a country begins to find and report a higher proportion of cases, then an increasing value of the reproduction number will be inferred. This is because all changes in the number of cases are attributed to changes in the number of infections resulting from previously reported cases, and are not assumed to be a result of improved testing and surveillance. On the other hand, if a country reports a lower proportion of cases because a lower number of tests are performed (which can happen if reagents required for testing are no longer available, for example) or the surveillance system captures a lower proportion of infections, then the model will attribute this to a drop in the reproduction number that may not be a true reduction. In order for our estimates to be unbiased not all cases have to be reported, but the level of testing effort (and therefore the proportion of detected cases) must be constant²⁷. This means that, whilst a change in testing effort will initially introduce bias, this will be reduced over time as long as the testing effort remains consistent from this point onwards.

Countries may also change the focus of their surveillance over the course of the outbreak. They may initially focus on identifying travellers returning from areas of known COVID-19 transmission and performing contact tracing on the contacts of known cases. As the outbreak evolves this may change to passive surveillance at hospitals. Here, the case definition may also change from tests based on polymerase chain reaction (PCR) to diagnoses based on symptoms and computed tomography (CT) scans. In the future, different kinds of COVID-19 tests may be deployed that could influence results, such as tests that detect both active and past infections.

Forecasting the reproduction number and case counts by date of infection

We forecast the time-varying effective reproduction number over a 14-day time horizon using the best performing ensemble of time series models¹¹ as assessed by iteratively fitting to a subsample of the estimated effective reproduction number estimates for each region²⁸. Perfomance was assessed using CRPS scores, interval scores, PIT calibration, bias and sharpness with an ensemble being preferred that minimised the CRPS score whilst being calibrated, unbiased and as sharp as possible over the full time horizon^29–31. The reproduction number forecast was then transformed into a case forecast using the renewal equation and a Poisson distribution of cases^6,19. These forecasts are indicative only and should not be considered with a weight equal to the real-time estimates. Changes in contact rates, mobility, and public health interventions are not accounted for which may lead to significant inaccuracy.

Reporting

We report the median and 90% highest density credible intervals for all measures with 50% and 90% high density regions shown in figures. The analysis was conducted independently for all regions and is updated regularly as new data becomes available. As our credible intervals do not capture the proportion of cases that have been upscaled (when correcting for right truncation), we represent this in figures using translucency. This is presented as our confidence in the estimates which we define as the proportion of symptom onsets that are expected to have been reported by the date of estimation. All results are available in the source repository in a comma-separated values file.

Underlying data

Website and latest data and available at: https://github.com/epiforecasts/covid.

Archived website and data at the time of publication: https://doi.org/10.5281/zenodo.3841818³².

License: MIT.

Development

EpiNow R package (R estimation, data processing, visualisation and reporting): https://github.com/epiforecasts/EpiNow.

EpiSoon R package (forecasting and case prediction from R trajectories): https://github.com/epiforecasts/EpiSoon.

NCoVUtils R package (data aggregation and processing): https://github.com/epiforecasts/NCoVUtils.

Archived at the time of publication

EpiNow R package: https://doi.org/10.5281/zenodo.3833806³⁶.

EpiSoon R package: https://doi.org/10.5281/zenodo.3833807²⁸.

NCoVUtils R package: https://doi.org/10.5281/zenodo.3833808¹³.

License: MIT.