C
Chris Peterson
Researcher at Colorado State University
Publications - 154
Citations - 3089
Chris Peterson is an academic researcher from Colorado State University. The author has contributed to research in topics: Grassmannian & Linear subspace. The author has an hindex of 27, co-authored 147 publications receiving 2747 citations. Previous affiliations of Chris Peterson include University of Notre Dame & University of Washington.
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Journal Article
Persistence images: a stable vector representation of persistent homology
Henry Adams,Tegan Emerson,Michael Kirby,Rachel Neville,Chris Peterson,Patrick D. Shipman,Sofya Chepushtanova,Eric Hanson,Francis C. Motta,Lori Ziegelmeier +9 more
TL;DR: In this article, a persistence diagram (PD) is converted to a finite-dimensional vector representation which is called a persistence image (PI) and proved the stability of this transformation with respect to small perturbations in the inputs.
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Biodegradability of biodiesel in the aquatic environment
TL;DR: In this paper, the biodegradability of various biodiesel fuels was examined by the CO2 evolution method (EPA 560/6-82-003), BOD5 (EPA 405.1), COD (EPA 410), and gas chromatography (GC) analyses in an aquatic system.
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Induction for secant varieties of Segre varieties
TL;DR: In this paper, the authors studied the dimension of secant varieties to Segre varieties and gave a complete classification of defective p-secant varieties for p < 6 and a series of conjectures about defective Segre ones.
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Gorenstein liaison, complete intersection liaison invariants and unobstructedness
TL;DR: In this article, Gaeta's theorem is proved on an ACM subscheme of projective spaces, where Glicci curves on arithmetically Cohen-Macaulay surfaces are considered.
Posted Content
Persistence Images: A Stable Vector Representation of Persistent Homology
Henry Adams,Sofya Chepushtanova,Tegan Emerson,Eric M. Hanson,Michael Kirby,Francis C. Motta,Rachel Neville,Chris Peterson,Patrick D. Shipman,Lori Ziegelmeier +9 more
TL;DR: This work converts a PD to a finite-dimensional vector representation which it is called a persistence image, and proves the stability of this transformation with respect to small perturbations in the inputs.