Effect of awareness,quarantine and vaccination as control strategies on COVID-19 with Co-morbidity and Re-infection

In this paper,a deterministic compartmental model is presented to assess the impact of vaccination and non-pharmaceutical interventions(social distance,awareness,face mask,and quarantine)on the transmission dynamics of COVID-19 with co-morbidity and reinfection.An expression for the basic reproduction number is then derived for this model.Theoretical analysis shows that the model exhibits backward bifurcation phenomenon when the basic reproduction number is less than unity.But for the case of no reinfection,the model has a globally asymptotically stable disease-free equilibrium(DFE)when the basic reproduction number is less than unity.Furthermore,it is shown that in the case of no re-infection,a unique endemic equilibrium point(EEP)of the model exists which is globally asymptotically stable whenever the reproduction number is greater than unity.From the global sensitivity and uncertainty analysis,we have identified mask coverage,mask efficacy,vaccine coverage,vaccine efficacy,and contact rate as the most influential parameters influencing the spread of COVID-19.Numerical simulation results show that the use of effective vaccines with proper implementation of non-pharmaceutical interventions could lead to the elimination of COVID-19 from the community.Numerical simulations also suggest that the control strategy that ensures a continuous and effective mass vaccination program is the most cost-effective control strategy.The study also shows that in the presence of any co-morbidity and with the occurrence of re-infection,the disease burden may increase.

Dynamics of novel COVID-19 in the presence of Co-morbidity

A novel coronavirus(COVID-19)has emerged as a global serious public health issue from December 2019.People having a weak immune system are more susceptible to coronavirus infection.It is a double challenge for people of any age with certain underlying medical conditions including cardiovascular disease,diabetes,high blood pressure and cancer etc.Co-morbidity increases the probability of COVID-19 complication.In this paper a deterministic compartmental model is formulated to understand the transmission dynamics of COVID-19.Rigorous mathematical analysis of the model shows that it exhibits backward bifurcation phenomenon when the basic reproduction number is less than unity.For the case of no re-infection it is shown that having the reproduction number less than one is necessary and sufficient for the effective control of COVID-19,that is,the disease free equilibrium is globally asymptotically stable when the reproduction threshold is less than unity.Furthermore,in the absence of reinfection,a unique endemic equilibrium of the model exists which is globally asymptotically stable whenever the reproduction number is greater than unity.Numerical simulations of the model,using data relevant to COVID-19 transmission dynamics,show that the use of efficacious face masks publicly could lead to the elimination of COVID-19 up to a satisfactory level.The study also shows that in the presence of co-morbidity,the disease increases significantly.