Expansive subdynamics for algebraic $Z^d$-actions
Abstract
A general framework for investigating topological actions of on compact metric spaces was proposed by Boyle and Lind in terms of expansive behavior along lower-dimensional subspaces of . Here we completely describe this expansive behavior for the class of algebraic -actions given by commuting automorphisms of compact abelian groups. The description uses the logarithmic image of an algebraic variety together with a directional version of Noetherian modules over the ring of Laurent polynomials in several commuting variables. We introduce two notions of rank for topological -actions, and for algebraic -actions describe how they are related to each other and to Krull dimension. For a linear subspace of we define the group of points homoclinic to zero along the subspace, and prove that this group is constant within an expansive component.
Cite
@article{arxiv.math/0104261,
title = {Expansive subdynamics for algebraic $Z^d$-actions},
author = {Manfred Einsiedler and Douglas Lind and Richard Miles and Thomas Ward},
journal= {arXiv preprint arXiv:math/0104261},
year = {2007}
}
Comments
39 pages, 9 eps figures