Global stability of the multi-strain Kermack-McKendrick (renewal) epidemic model

Abstract

We extend a recent investigation by Meehan et al. (2019) regarding the global stability properties of the general Kermack-McKendrick (renewal) model to the multi-strain case. We demonstrate that the basic reproduction number of each strain R0j represents a sharp threshold parameter such that when R0j ≤ 1 for all j each strain dies out and the infection-free equilibrium is globally asymptotically stable; whereas for R01 maxj\, R0j > 1 the endemic equilibrium point P1, at which only the fittest strain (i.e. strain 1) remains in circulation, becomes globally asymptotically stable.