The Jordan type of a multiparameter persistence module

Abstract

Let P be a poset and S a sequence of n finite substes of P. The Jordan type of a P-persistence module M at S, denoted by JS(M) ∈ Nn, is defined as the Jordan type of a nilpotent operator TM, S, which is constructed from M and S. When n=2, we recover the notion of multirank previously introduced and studied in [Tho19]. We first prove that the multirank invariants are complete for persistence modules over finite zigzag posets. This proves a conjecture of Thomas in the zigzag case. The nilpotent operator TM, S is functorial in M. When P=Zd or Rd, this functoriality allows us to define the Jordan filtered rank invariant of M at S. We demonstrate that these invariants are strictly finer than the classical rank invariants. We next prove that for any two P-persistence modules M and N, the landscape and erosion distances between their Jordan filtered rank invariants are bounded from above by the interleaving distance between M and N.

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