Forecast Analysis of the Epidemics Trend of COVID-19 in the USA by a Generalized Fractional-order SEIR Model
Overview
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In this paper, a generalized fractional-order SEIR model is proposed, denoted by SEIQRP model, which divided the population into susceptible, exposed, infectious, quarantined, recovered and insusceptible individuals and has a basic guiding significance for the prediction of the possible outbreak of infectious diseases like the coronavirus disease in 2019 (COVID-19) and other insect diseases in the future. Firstly, some qualitative properties of the model are analyzed. The basic reproduction number is derived. When , the disease-free equilibrium point is unique and locally asymptotically stable. When , the endemic equilibrium point is also unique. Furthermore, some conditions are established to ensure the local asymptotic stability of disease-free and endemic equilibrium points. The trend of COVID-19 spread in the USA is predicted. Considering the influence of the individual behavior and government mitigation measurement, a modified SEIQRP model is proposed, defined as SEIQRPD model, which is divided the population into susceptible, exposed, infectious, quarantined, recovered, insusceptible and dead individuals. According to the real data of the USA, it is found that our improved model has a better prediction ability for the epidemic trend in the next two weeks. Hence, the epidemic trend of the USA in the next two weeks is investigated, and the peak of isolated cases is predicted. The modified SEIQRP model successfully capture the development process of COVID-19, which provides an important reference for understanding the trend of the outbreak.
Sadri K, Aminikhah H, Aminikhah M MethodsX. 2023; 10:102045.
PMID: 36742367 PMC: 9883209. DOI: 10.1016/j.mex.2023.102045.
Lu Z, Chen Y, Yu Y, Ren G, Xu C, Ma W ISA Trans. 2022; 132:582-597.
PMID: 36567189 PMC: 9748852. DOI: 10.1016/j.isatra.2022.12.006.
Using simulation modelling and systems science to help contain COVID-19: A systematic review.
Zhang W, Liu S, Osgood N, Zhu H, Qian Y, Jia P Syst Res Behav Sci. 2022; .
PMID: 36245570 PMC: 9538520. DOI: 10.1002/sres.2897.
Okundalaye O, Othman W, Oke A J Comput Appl Math. 2022; 416:114506.
PMID: 35854870 PMC: 9284567. DOI: 10.1016/j.cam.2022.114506.
Analysis of COVID-19 epidemic model with sumudu transform.
Farman M, Azeem M, Ahmad M AIMS Public Health. 2022; 9(2):316-330.
PMID: 35634031 PMC: 9114793. DOI: 10.3934/publichealth.2022022.