On a Surface Associated with Pascal’s Triangle

Valeriu Beiu; Leonard Dăuş; Marilena Jianu; Adela Mihai; Ion Mihai

doi:10.3390/sym14020411

Symmetry (Feb 2022)

On a Surface Associated with Pascal’s Triangle

Valeriu Beiu,
Leonard Dăuş,
Marilena Jianu,
Adela Mihai,
Ion Mihai

Affiliations

Valeriu Beiu: Faculty of Exact Sciences, “Aurel Vlaicu” University of Arad, 310032 Arad, Romania
Leonard Dăuş: Department of Mathematics and Computer Science, Technical University of Civil Engineering Bucharest, 020396 Bucharest, Romania
Marilena Jianu: Department of Mathematics and Computer Science, Technical University of Civil Engineering Bucharest, 020396 Bucharest, Romania
Adela Mihai: Department of Mathematics and Computer Science, Technical University of Civil Engineering Bucharest, 020396 Bucharest, Romania
Ion Mihai: Department of Mathematics, University of Bucharest, 010014 Bucharest, Romania

DOI: https://doi.org/10.3390/sym14020411
Journal volume & issue: Vol. 14, no. 2
p. 411

Abstract

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An open problem in reliability theory is that of finding all the coefficients of the reliability polynomial associated with particular networks. Because reliability polynomials can be expressed in Bernstein form (hence linked to binomial coefficients), it is clear that an extension of the classical discrete Pascal’s triangle (comprising all the binomial coefficients) to a continuous version (exhibiting infinitely many values in between the binomial coefficients) might be geometrically helpful and revealing. That is why we have decided to investigate the geometric properties of a continuous extension of Pascal’s triangle including: Gauss curvatures, mean curvatures, geodesics, and level curves, as well as their symmetries.

Published in Symmetry

ISSN: 2073-8994 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Mathematics
Website: http://www.mdpi.com/journal/symmetry/

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