Euler Characteristics and Homotopy Types of Definable Sublevel Sets, with Applications to Topological Data Analysis

Abstract

Given a definable function f: S R on a definable set S, we study sublevel sets of the form Sft \x ∈ S: f(x) ≤ t\ for all t ∈ R. Using o-minimal structures, we prove that the Euler characteristic of Sft is right-continuous with respect to t. Furthermore, when S is compact, we show that Sft+δ deformation retracts to Sft for all sufficiently small δ > 0. Applying these results, we also characterize the connections between the following concepts in topological data analysis: the Euler characteristic transform (ECT), smooth ECT, Euler-Radon transform (ERT), and smooth ERT.