Compartment Model Spec¶
Diagram¶
Evolution Equations¶
Where the compartments $E$, $I$ and $R^H$ are gamma-distributed with $k=2$
Force of infection for age group $i$ at location $j$ is
\begin{align*}
\lambda_{ij} &= \beta_{ikjl} I^{kl} \\
\beta_{ikjl} &= \beta \widetilde{C}_{ik} \widetilde{M}_{jl} \\
\widetilde{C}_{ij} &= \frac{C_{ij}}{\sum_k C_{ik}} \\
\widetilde{M}_{ij} &= \frac{M_{ij}}{\sum_k M_{ik}}
\end{align*}
TODO mention calculation of ifr from cfr, case report and asym
TODO chr is being applied to asym? wouldnt that make it IHR?
TODO this is missing normalization related stuff
\begin{align*}
\frac{dS_{ij}}{dt} &= - \frac{\lambda_{ij} S_{ij}}{N_{ij}} \\
\frac{dE_{ij}}{dt} &= \frac{\lambda_{ij} S_{ij}}{N_{ij}} - \sigma E_{ij}\\
\frac{dI^{\text{asym}}_{ij}}{dt} &= \asym(1-\chr)\sigma E_{ij} - \gamma I^{\text{asym}}_{ij}\\
\frac{dI^{\text{mild}}_{ij}}{dt} &= (1-\asym)(1-\chr)\sigma E_{ij} - \gamma I^{\text{mild}}_{ij}\\
\\
\frac{dI^{\text{hosp}}_{ij}}{dt} &= \chr\sigma E_{ij} - \gamma I^{\text{hosp}}_{ij}\\
\frac{dR^{\text{hosp}}_{ij}}{dt} &= (1-\cfr)\gamma I^{\text{hosp}}_{ij} - \rho R^{\text{hosp}}_{ij} \\
\frac{dD_{ij}}{dt} &= \cfr\gamma I^{\text{hosp}}_{ij} \\
\\
\frac{dR_{ij}}{dt} &= \rho R^{\text{hosp}}_{ij} + \gamma (I^{\text{asym}}_{ij} + I^{\text{mild}}_{ij})
\end{align*}