Background Clinical reinfection with varicella is normally ignored in mathematical transmission models as it is considered too rare to be important. Methods We apply basic bifurcation analysis to a simple mathematical model of varicella-zoster virus (VZV) transmission incorporating reinfection. Results We demonstrate that under certain conditions this model can exhibit periodic behaviour as opposed to what is observed in VZV models that ignore the possibility of repeat varicella attacks. Periodicity can be induced by a combination of immune boosting and reinfection while the impact of zoster (shingles) recurrence on the onset of periodicity is negligible. Conclusions Our results suggest that mathematical models of VZV may benefit from inclusion of repeat varicella. Electronic supplementary material The online version of this article (doi:10.1186/s12976-015-0002-5) contains supplementary material, which is available to authorized users.
【저자키워드】 recurrence, varicella, Zoster, shingles, Periodicity,