Decomposing the Persistent Homology Transform of Star-Shaped Objects

Abstract

In this paper, we study the geometric decomposition of the degree-0 Persistent Homology Transform (PHT) as viewed as a persistence diagram bundle. We focus on star-shaped objects as they can be segmented into smaller, simpler regions known as ``sectors''. Algebraically, we demonstrate that the degree-0 persistence diagram of a star-shaped object in R2 can be derived from the degree-0 persistence diagrams of its sectors. Using this, we then establish sufficient conditions for star-shaped objects in R2 so that they have ``trivial geometric monodromy''. Consequently, the PHT of such a shape can be decomposed as a union of curves parameterized by S1, where the curves are given by the continuous movement of each point in the persistence diagrams that are parameterized by S1. Finally, we discuss the current challenges of generalizing these results to higher dimensions.