发布时间:2024-06-02
Numerical attractors with lower semicontinuity for porous media lattice systems
主讲人:李扬荣
摘要:In this talk, we focus on discretization of global attractors for p-Laplace or porous media lattice systems. More precisely, by the implicit Euler scheme, the continuous-time lattice systems are discretized as discrete-time systems. We then show the existence and bounds of numerical attractors as well as solutions for the discrete-time system with sufficiently small step sizes, and establish the upper semi-convergence of numerical attractors towards the global attractor as the step size tends to zero. We also study the numerical attractors and their approximations on the larger initial space. The second-order Taylor expansion and discretization error on the enlarged space are established to prove the upper semi-continuity of the enlarged numerical attractors in step sizes, while an upper bound of the enlarged attractors is provided to establish the lower semi-continuity in special cases.