The intuitionistic temporal logic of dynamical systems

Abstract

A dynamical system is a pair (X,f), where X is a topological space and f X X is continuous. Kremer observed that the language of propositional linear temporal logic can be interpreted over the class of dynamical systems, giving rise to a natural intuitionistic temporal logic. We introduce a variant of Kremer's logic, which we denote ITLc, and show that it is decidable. We also show that minimality and Poincar\'e recurrence are both expressible in the language of ITLc, thus providing a decidable logic expressive enough to reason about non-trivial asymptotic behavior in dynamical systems.