English

On Interval Decomposability of 2D Persistence Modules

Representation Theory 2021-05-25 v2

Abstract

In the persistent homology of filtrations, the indecomposable decompositions provide the persistence diagrams. However, in almost all cases of multidimensional persistence, the classification of all indecomposable modules is known to be a wild problem. One direction is to consider the subclass of interval-decomposable persistence modules, which are direct sums of interval representations. We introduce the definition of pre-interval representations, a more natural algebraic definition, and study the relationships between pre-interval, interval, and indecomposable thin representations. We show that over the ``equioriented'' commutative 22D grid, these concepts are equivalent. Moreover, we provide a criterion for determining whether or not an nnD persistence module is interval/pre-interval/thin-decomposable without having to explicitly compute decompositions. For 22D persistence modules, we provide an algorithm together with a worst-case complexity analysis that uses the total number of intervals in an equioriented commutative 22D grid. We also propose several heuristics to speed up the computation.

Keywords

Cite

@article{arxiv.1812.05261,
  title  = {On Interval Decomposability of 2D Persistence Modules},
  author = {Hideto Asashiba and Mickaël Buchet and Emerson G. Escolar and Ken Nakashima and Michio Yoshiwaki},
  journal= {arXiv preprint arXiv:1812.05261},
  year   = {2021}
}

Comments

37 pages

R2 v1 2026-06-23T06:41:00.979Z