English

Linearization and H\" older Continuity for Nonautonomous Systems

Dynamical Systems 2021-07-14 v3 Classical Analysis and ODEs

Abstract

We consider a nonautonomous system x˙=A(t)x+f(t,x,y),y˙=g(t,y) \dot x=A(t)x+f(t,x,y),\quad \dot y = g(t,y) and give conditions under which there is a transformation of the form H(t,x,y)=(x+h(t,x,y),y)H(t,x,y)=(x+h(t,x,y),y) taking its solutions onto the solutions of the partially linearized system x˙=A(t)x,y˙=g(t,y). \dot x=A(t)x,\quad \dot y = g(t,y). Shi and Xiong \cite{SX} proved a special case where g(t,y)g(t,y) was a linear function of yy and x˙=A(t)x\dot x=A(t)x had an exponential dichotomy. Our assumptions on AA and ff are of the general form considered by Reinfelds and Steinberga \cite{RS}, which include many of the generalizations of Palmer's theorem proved by other authors. Inspired by the work of Shi and Xiong, we also prove H\" older continuity of HH and its inverse in xx and yy. Again the proofs are given in the context of Reinfelds and Steinberga but we show what the results reduce to when x˙=A(t)x\dot x=A(t)x is assumed to have an exponential dichotomy. The paper is concluded with the discrete version of the results.

Cite

@article{arxiv.2010.03605,
  title  = {Linearization and H\" older Continuity for Nonautonomous Systems},
  author = {Lucas Backes and Davor Dragičević and Kenneth J. Palmer},
  journal= {arXiv preprint arXiv:2010.03605},
  year   = {2021}
}

Comments

Revised version. Accepted for publication in the Journal of Differential Equations

R2 v1 2026-06-23T19:08:41.540Z