Discrete homotopic distance between Lipschitz maps

Abstract

In this paper, we investigate a discrete version of the homotopic distance between two s-Lipschitz maps for s ≥ 0. This distance is defined by specifying a step length r to which some homotopy relation corresponds. In spaces with a significant number of holes, where no continuous homotopy exist and the homotopic distance equals infinite, the discrete homotopic distance provides a meaningful classification by effectively ignoring smaller holes. We show that the discrete homotopic distance Dr generalizes key concepts such as the discrete Lusternik-Schnirelmann category catr and the discrete topological complexity TCr. Furthermore, we prove that Dr is invariant under discrete homotopy relations. This approach offers a flexible framework for classifying s-Lipschitz maps, loops, and paths based on the choice of r.