📝 SummarXiv

Abstract

We initiate a study of a new kind of topological-dynamical stability by investigating when permutations of finite sets within a metric space which are close to being actions by a group can be perturbed to genuine actions. We show these perturbing problems can have solutions in the case of dynamics on the Cantor set, and develop a theoretical framework for potentially producing examples of other perturbing problems with no solution. We also investigate connections with semiprojectivity of $C^*$-algebras. In doing so, we define a notion of conditional semiprojectivity and show that maps of finite-dimensional $C^*$-algebras are conditionally semiprojective, but that the inclusion of $C(S^1)$ into $C(S^1)\rtimes \Gamma$ (for any non-trivial action) is not.