Coexistence and numerical solutions of the unstirred chemostat model
This paper studies a competition model between two species for two resources in the chemostat with the Beddington-DeAngelis functional response.The sufficient condition to the coexistence of positive steady state solutions is obtained by the mathematical methods of the fixed point degree theory in cones.Finally,Some results of numerical simulations is presented to prove and complement the previous mathematical results by numerical computation method.Furthermore,the research result implies that two species in the biological environment can be coexistence after a long time.
Chemostat Coexistence Numerical
Xiaozhou Feng Meihua Wei Changtong Li
Department of Mathematics and Physics, Xian Technological University, Xian,710032, China Institute of Mathematics, Shaanxi Normal University, Xian,710062, China
国际会议
西安
英文
708-713
2012-08-24(万方平台首次上网日期,不代表论文的发表时间)