Contents Online
Communications in Mathematical Sciences
Volume 21 (2023)
Number 6
Discrete perturbed gradient flow and its application
Pages: 1505 – 1530
DOI: https://dx.doi.org/10.4310/CMS.2023.v21.n6.a3
Authors
Abstract
We study discrete dynamical system with perturbed gradient flow structure and its related applications. We prove that states with uniform bound will eventually converge to an equilibrium state, where Łojasiewicz inequality plays an important role. Moreover, the convergence rate is uniform with respect to the mesh size, which implies uniform transition from discrete time model to continuous time model. As direct applications, we use this theory to prove the emergent dynamics in discrete thermodynamic Kuramoto model and swarmalator model.
Keywords
discrete perturbed gradient flow, Łojasiewicz inequality, discrete swarmalator model
2010 Mathematics Subject Classification
34D05, 39A10, 39A12, 68M10
Received 2 November 2021
Received revised 14 October 2022
Accepted 15 November 2022
Published 22 September 2023