Persistent homology transform for modeling shapes and surfaces

Turner, Katharine; Mukherjee, Sayan; Boyer, Douglas

doi:10.1093/imaiai/iau011

Cited by 139 publications

(161 citation statements)

References 36 publications

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“…, n}, and forms an n-dimensional path by running in the i-th coordinate with unit speed if the i-th bar is active (otherwise remaining constant). Euler embedding ι χ : reduces a barcode to a single Euler characteristic curve (see [33,Sec. 3.2]).…”

Section: Introductionmentioning

confidence: 99%

Persistence Paths and Signature Features in Topological Data Analysis

Chevyrev

Nanda

Oberhauser

2020

IEEE Trans. Pattern Anal. Mach. Intell.

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We introduce a new feature map for barcodes that arise in persistent homology computation. The main idea is to first realize each barcode as a path in a convenient vector space, and to then compute its path signature which takes values in the tensor algebra of that vector space. The composition of these two operations -barcode to path, path to tensor series -results in a feature map that has several desirable properties for statistical learning, such as universality and characteristicness, and achieves state-of-the-art results on common classification benchmarks.Persistence paths and signature features. Notwithstanding their usefulness for certain tasks, barcodes are notoriously unsuitable for standard statistical inference because 1 arXiv:1806.00381v2 [stat.ML]

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Section: Introductionmentioning

confidence: 99%

Persistence Paths and Signature Features in Topological Data Analysis

Chevyrev

Nanda

Oberhauser

2020

IEEE Trans. Pattern Anal. Mach. Intell.

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“…It simply sees past the parameterization. Our approach is very similar to both the persistent homology transform of Turner et al [26] and the persistence distortion distance of Dey et al [14]. However, we extend these ideas to arbitrary metrics and give the first connections between these approaches and the Fréchet distance (see Section 4).…”

Section: F (T) − G(h(t))mentioning

confidence: 84%

“…In that case, the signature could be computed using the Vineyard algorithm of Cohen-Steiner et al [12]. This would be the first step towards a coordinate-free version of the persistent homology transform of Turner et al [26].…”

Section: Future Work and Open Questionsmentioning

confidence: 99%

Fréchet-Stable Signatures Using Persistence Homology

Sheehy

2018

Proceedings of the Twenty-Ninth Annual ACM-SIAM Symposium on Discrete Algorithms

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For a metric space Y , the Fréchet distance is a metric on trajectories f, g :, g(h(t))) over continuous reparameterizations h of time. One can define the generalized Fréchet distance between more complex objects, functions f : X → Y where X is some topological space that minimizes over homeomorphisms from X → X. This more general definition has been studied for surfaces and often leads to computationally hard problems. We show how to compute in polynomial-time signatures for these functions for which the resulting metric on the signatures can also be computed in polynomial-time and provides a meaningful lower bound on the generalized Fréchet distance. Our approach uses persistent homology and exploits the natural invariance of persistence diagrams of functions to homeomorphisms of the domain. Our algorithm for computing the signatures in Euclidean spaces uses a new method for computing persistent homology of convex functions on simplicial complexes which may be of independent interest.

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“…The Euler characteristic has also been used for classification of shapes (Richardson & Werman, 2014). See also Turner et al (2014). Bendich et al (2010) use topological methods to study the interactions between root systems of plants.…”

Section: Other Applicationsmentioning

confidence: 99%