On determining the homological Conley index of Poincar\'e maps in autonomous systems
Abstract
A theorem on computation of the homological Conley index of an isolated invariant set of the Poincar\'e map associated to a section in a rotating local dynamical system φ is proved. Let (N,L) be an index pair for a discretization φh of φ, where h>0, and let S denote the invariant part of N L; it follows that the section S0 of S is an isolated invariant set of the Poincar\'e map. The theorem asserts that if the sections N0 of N and L0 of L are ANRs, the homology classes [uj] of some cycles uj form a basis of H(N0,L0), and for some scalars aij, the cycles uj and Σ aijui are homologous in the covering pair ( N, L) of (N,L) and the homology relation is preserved in ( N, L) under the transformation induced by φt for t∈ [0,h] then the homological Conley index of S0 is equal to the Leray reduction of the matrix [aij]. In particular, no information on the values of the Poincar\'e map or its approximations is required. In a special case of the system generated by a T-periodic non-autonomous ordinary differential equation with rational T/h>1, the theorem was proved in the paper M.\,Mrozek, R.\,Srzednicki, and F.\,Weilandt, SIAM J. Appl. Dyn. Syst. 14 (2015), 1348-1386, and it motivated a construction of an algorithm for determining the index.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.