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10.1016/j.rinp.2021.104432 http://scihub22266oqcxt.onion/10.1016/j.rinp.2021.104432 34150484!8205281!34150484     free     free     free Deprecated: Implicit conversion from float 211.6 to int loses precision in C:\Inetpub\vhosts\kidney.de\httpdocs\pget.php on line 534 Deprecated: Implicit conversion from float 211.6 to int loses precision in C:\Inetpub\vhosts\kidney.de\httpdocs\pget.php on line 534 Deprecated: Implicit conversion from float 211.6 to int loses precision in C:\Inetpub\vhosts\kidney.de\httpdocs\pget.php on line 534 Deprecated: Implicit conversion from float 211.6 to int loses precision in C:\Inetpub\vhosts\kidney.de\httpdocs\pget.php on line 534 Deprecated: Implicit conversion from float 211.6 to int loses precision in C:\Inetpub\vhosts\kidney.de\httpdocs\pget.php on line 534       Results+Phys 2021 ; 26 (ä): 104432 Nephropedia Template TP {{tp|p=34150484|t=2021. An analytical study of the dynamic behavior of Lotka-Volterra based models of COVID-19 |pdf=|usr=}}{{34150484}} gab.com Text An analytical study of the dynamic behavior of Lotka-Volterra based models of COVID-19 JO: Results Phys http://www.kidney.de/pget.php?&tw=1&pmid=34150484 #FOAvip COVID-19 has become a world wide pandemic since its first appearance at the end of the year 2019. Although some vaccines have already been announced, a new mutant version has been reported in UK. We certainly should be more careful and make further investigations to the virus spread and dynamics. This work investigates dynamics in Lotka-Volterra based Models of COVID-19. The proposed models involve fractional derivatives which provide more adequacy and realistic description of the natural phenomena arising from such models. Existence and boundedness of non-negative solution of the fractional model is proved. Local stability is also discussed based on Matignon's stability conditions. Numerical results show that the fractional parameter has effect on flattening the curves of the coexistence steady state. This interesting foundation might be used among the public health strategies to control the spread of COVID-19 and its mutated versions. Twit Text FOAVip An analytical study of the dynamic behavior of Lotka-Volterra based models of COVID-19 ????Results Phys http://www.kidney.de/pget.php?&tw=1&pmid=34150484 #FOAvip Twit Text # Free Paper on # # # # # LINK http://www.kidney.de/pget.php?&tw=1&pmid=34150484 #FOAvip English Wikipedia <ref>{{Cite pmid|34150484}}</ref> An analytical study of the dynamic behavior of Lotka-Volterra based models of COVID-19 #MMPMID34150484 Mohammed WW; Aly ES; Matouk AE; Albosaily S; Elabbasy EM Results Phys 2021[Jul]; 26 (ä): 104432 PMID34150484show ga COVID-19 has become a world wide pandemic since its first appearance at the end of the year 2019. Although some vaccines have already been announced, a new mutant version has been reported in UK. We certainly should be more careful and make further investigations to the virus spread and dynamics. This work investigates dynamics in Lotka-Volterra based Models of COVID-19. The proposed models involve fractional derivatives which provide more adequacy and realistic description of the natural phenomena arising from such models. Existence and boundedness of non-negative solution of the fractional model is proved. Local stability is also discussed based on Matignon's stability conditions. Numerical results show that the fractional parameter has effect on flattening the curves of the coexistence steady state. This interesting foundation might be used among the public health strategies to control the spread of COVID-19 and its mutated versions. äAn analytical study of the dynamic behavior of Lotka-Volterra based mo(epmc).pdf DeepDyve Pubget Overpricing