R
Roberto Pelayo
Researcher at University of Hawaii at Hilo
Publications - 24
Citations - 571
Roberto Pelayo is an academic researcher from University of Hawaii at Hilo. The author has contributed to research in topics: Monoid & Factorization. The author has an hindex of 12, co-authored 24 publications receiving 479 citations.
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Curriculum Guidelines for Undergraduate Programs in Data Science
Richard D. De Veaux,Mahesh Agarwal,Maia Averett,Benjamin S. Baumer,Andrew Bray,Thomas Bressoud,Lance Bryant,Lei Zhang Cheng,Amanda Francis,Robert G. Gould,Albert Y. Kim,Matt Kretchmar,Qin Lu,Ann Moskol,Deborah Nolan,Roberto Pelayo,Sean Raleigh,Ricky J. Sethi,Mutiara Sondjaja,Neelesh Tiruviluamala,Paul X. Uhlig,Talitha M. Washington,Curtis L. Wesley,David White,Ping Ye +24 more
TL;DR: These guidelines are meant to provide some structure for institutions planning for or revising a major in Data Science.
Journal ArticleDOI
Curriculum Guidelines for Undergraduate Programs in Data Science
Richard D. De Veaux,Mahesh Agarwal,Maia Averett,Benjamin S. Baumer,Andrew Bray,Thomas Bressoud,Lance Bryant,Lei Zhang Cheng,Amanda Francis,Robert G. Gould,Albert Y. Kim,Matt Kretchmar,Qin Lu,Ann Moskol,Deborah Nolan,Roberto Pelayo,Sean Raleigh,Ricky J. Sethi,Mutiara Sondjaja,Neelesh Tiruviluamala,Paul X. Uhlig,Talitha M. Washington,Curtis L. Wesley,David White,Ping Ye +24 more
TL;DR: The Park City Math Institute (PCMI) 2016 Summer Undergraduate Faculty Program met for the purpose of composing guidelines for undergraduate programs in Data Science as discussed by the authors, and the group consisted of 25 undergraduate faculty from a variety of institutions in the U.S., primarily from the disciplines of mathematics, statistics and computer science.
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On the set of elasticities in numerical monoids
TL;DR: In this article, it was shown that the set of length sets for any arithmetical numerical monoid S can be completely recovered from its set of elasticities R(S).
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On dynamic algorithms for factorization invariants in numerical monoids
TL;DR: This paper presents dynamic algorithms for the factorization set, length set, delta set, and $\omega$-primality in numerical monoids and demonstrates that these algorithms give significant improvements in runtime and memory usage.
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On Delta Sets and their Realizable Subsets in Krull Monoids with Cyclic Class Groups
TL;DR: In this article, it was shown that not all subsets of a Krull monoid with finite cyclic class group can be realized as delta sets of an individual element from the monoid.