Dynamics of periodic solutions in the reaction-diffusion glycolysis model: Mathematical mechanisms of Turing pattern formation
作者:
Highlights:
• A diffusion rate formula is established to determine Turing instability of the periodic solutions of the system.
• We prove that cross-diffusion destroys the stable spatially homogeneous periodic solutions for the diffusive glycolysis system.
• By numerical simulations, we verify that Turing instability of periodic solutions is really induced by cross- diffusion.
摘要
•A diffusion rate formula is established to determine Turing instability of the periodic solutions of the system.•We prove that cross-diffusion destroys the stable spatially homogeneous periodic solutions for the diffusive glycolysis system.•By numerical simulations, we verify that Turing instability of periodic solutions is really induced by cross- diffusion.
论文关键词:Glycolysis Sel’kov system,Cross-diffusion,Periodic solutions,Turing instability,Hopf bifurcation
论文评审过程:Received 18 February 2022, Revised 24 May 2022, Accepted 10 June 2022, Available online 19 June 2022, Version of Record 19 June 2022.
论文官网地址:https://doi.org/10.1016/j.amc.2022.127324
