English

Spatial discretizations of generic dynamical systems

Dynamical Systems 2016-03-22 v1

Abstract

How is it possible to read the dynamical properties (ie when the time goes to infinity) of a system on numerical simulations? To try to answer this question, we study in this manuscript a model reflecting what happens when the orbits of a discrete time system ff (for example an homeomorphism) are computed numerically . The computer working in finite numerical precision, it will replace ff by a spacial discretization of ff, denoted by fNf_N (where the order NN of discretization stands for the numerical accuracy). In particular, we will be interested in the dynamical behaviour of the finite maps fNf_N for a generic system ff and NN going to infinity, where generic will be taken in the sense of Baire (mainly among sets of homeomorphisms or C1C^1-diffeomorphisms). The first part of this manuscript is devoted to the study of the dynamics of the discretizations fNf_N, when ff is a generic conservative/dissipative homeomorphism of a compact manifold. We show that it would be mistaken to try to recover the dynamics of ff from that of a single discretization fNf_N : its dynamics strongly depends on the order NN. To detect some dynamical features of ff, we have to consider all the discretizations fNf_N when NN goes through N\mathbf N. The second part deals with the linear case, which plays an important role in the study of C1C^1-generic diffeomorphisms, discussed in the third part of this manuscript. Under these assumptions, we obtain results similar to those established in the first part, though weaker and harder to prove.

Keywords

Cite

@article{arxiv.1603.06480,
  title  = {Spatial discretizations of generic dynamical systems},
  author = {Pierre-Antoine Guihéneuf},
  journal= {arXiv preprint arXiv:1603.06480},
  year   = {2016}
}

Comments

322 pages. This is an improved version of the thesis of the author (among others, the introduction and conclusion have been translated into English). In particular, it contains works already published on arXiv. Comments welcome !

R2 v1 2026-06-22T13:15:24.179Z