Computing Minimal Presentations and Bigraded Betti Numbers of 2-Parameter Persistent Homology

Lesnick, Michael; Wright, Matthew

doi:10.48550/arxiv.1902.05708

Cited by 12 publications

(49 citation statements)

References 31 publications

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“…1. Compute the minimal presentations of M and N by the algorithm given in [Lesnick and Wright, 2019]. 2.…”

Section: Generalized Matching Distancementioning

confidence: 99%

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Rectangular Approximation and Stability of $2$-parameter Persistence Modules

Dey,

Xin

2021

Preprint

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One of the main reasons for topological persistence being useful in data analysis is that it is backed up by a stability (isometry) property: persistence diagrams of 1-parameter persistence modules are stable in the sense that the bottleneck distance between two diagrams equals the interleaving distance between their generating modules. However, in multi-parameter setting this property breaks down in general. A simple special case of persistence modules called rectangle decomposable modules is known to admit a weaker stability property. Using this fact, we derive a stability-like property for 2-parameter persistence modules. For this, first we consider interval decomposable modules and their optimal approximations with rectangle decomposable modules with respect to the bottleneck distance. We provide a polynomial time algorithm to exactly compute this optimal approximation which, together with the polynomial-time computable bottleneck distance among interval decomposable modules, provides a lower bound on the interleaving distance. Next, we leverage this result to derive a polynomial-time computable distance for general multi-parameter persistence modules which enjoys similar stability-like property. This distance can be viewed as a generalization of the matching distance defined in the literature.

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“…1. Compute the minimal presentations of M and N by the algorithm given in [Lesnick and Wright, 2019]. 2.…”

Section: Generalized Matching Distancementioning

confidence: 99%

“…In practice, the data is often given as a simplicial filtration which induces the persistence module. It is shown in [Lesnick and Wright, 2019] that for a 2-parameter persistence module, a finite presentation can be computed in cubic time.…”

Section: Output Maxmentioning

confidence: 99%

Rectangular Approximation and Stability of $2$-parameter Persistence Modules

Dey,

Xin

2021

Preprint

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“…Asashiba et al provided a criterion for determining whether or not a given multiparameter persistence module is interval decomposable without having to explicitly compute decompositions [1]. Efficient algorithms for computing minimal presentations and the bigraded Betti numbers of 2-parameter persistence modules have been studied in [33,39]. In the special case of 2-parameter persistence modules that arise from the zeroth homology of Rips bifiltrations, an efficient combinatorial method to compute the bigraded Betti numbers has been proposed in [10].…”

Section: Hilbert Functionmentioning

confidence: 99%

Bigraded Betti numbers and Generalized Persistence Diagrams

Kim¹,

Moore²

2021

Preprint

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We show that the generalized persistence diagram by Kim and Mémoli encodes the bigraded Betti numbers of finite 2-parameter persistence modules. More interestingly, the way to read off the bigraded Betti numbers from the generalized persistence diagram is parallel to how the bigraded Betti numbers are extracted from interval decomposable modules. Our results implies that all invariants of 2-parameter persistence modules that are computed by the software RIVET are encoded in the generalized persistence diagram. Along the way, we verify that an invariant of finite 2-parameter persistence modules that was recently introduced by Asashiba et al. also encodes the bigraded Betti numbers.

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“…Proof. Proposition 2.3 of [LW19] states the following relation between the point-wise dimension of a (finitely presented) n-parameter persistence module V and its Betti tables ξ j , which is an easy consequence of Hilbert's Syzygy theorem:…”

Section: Euler Characteristic For Persistence Modulesmentioning

confidence: 99%

“…For details on persistence modules not satisfying this property, see, e.g., [CSV17]. The corresponding pth Betti table ξ i p : Z n → N is obtained as the pth homology of the Koszul complex associated with the persistence module, a strategy already used in [Knu08] and later in [LW19]. As for the number c i (u) of the critical points of index i at grade u ∈ Z n of the filtration, we count them as the dimension of the homology at grade u relative to the previous grades: c i (u) := dim H i (X u , ∪ j X u−ej ).…”

Section: Introductionmentioning

confidence: 99%

Morse inequalities for the Koszul complex of multi-persistence

Guidolin¹,

Landi²

2021

Preprint

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In this paper, we derive inequalities bounding the number of critical cells in a filtered cell complex on the one hand, and the entries of the Betti tables of the multi-parameter persistence modules of such filtrations on the other hand. Using the Mayer-Vietoris spectral sequence we first obtain strong and weak Morse inequalities involving the above quantities, and then we improve the weak inequalities achieving a sharp lower bound for the number of critical cells.Furthermore, we prove a sharp upper bound for the minimal number of critical cells, expressed again in terms of the entries of Betti tables.

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Computing Minimal Presentations and Bigraded Betti Numbers of 2-Parameter Persistent Homology

Cited by 12 publications

References 31 publications

Rectangular Approximation and Stability of $2$-parameter Persistence Modules

Rectangular Approximation and Stability of $2$-parameter Persistence Modules

Bigraded Betti numbers and Generalized Persistence Diagrams

Morse inequalities for the Koszul complex of multi-persistence

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