Given a topological dynamical systems \((X, T)\), consider a sequence of continuous potentials \(F := \{f_n: X → \mathbb{R}\}_{n\geq 1}\) that is asymptotically approached by sub-additive families. In a generalized version of ergodic optimization theory, one is interested in describing the set \(M_{\rm max}(F)\) of \(T\)-invariant probabilities that attain the following maximum value \({\rm max} \{\lim_{ n\to\infty} \frac{1}{n} \int f_n d\mu : \mu\ {\rm is}\ T{\rm -invariant\ probability}\}\). For this purpose, we extend the notion of Aubry set, denoted by \(\Omega(F)\). Our main result provide a sufficient condition for the Aubry set to be a maximizing set, i. e., \(\mu\) belongs to \(M_{\rm max}(F)\) if, and only if, its support lies on \(\Omega(F)\). Furthermore, we apply this result to the study of the generalized spectral radius in order to show the existence of periodic matrix configurations approaching this value.
Número:
13
Ano:
2014
Autor:
Eduardo Garibaldi
João Tiago Assunção Gomes
Abstract:
Keywords:
Atkinson’s theorem
Aubry set
ergodic optimization
generalized spectral radius
joint spectral radius
maximizing probabilities
maximizing set
Mathematics Subject Classification 2010 (MSC 2010):
15A18; 15A60; 37A05; 37A50; 37B10
Observação:
12/14