Infinite log-concavity: developments and conjectures

Infinite log-concavity: developments and conjectures

Given a sequence $(a_k)=a_0,a_1,a_2,\ldots$ of real numbers, define a new sequence $\mathcal{L}(a_k)=(b_k)$ where $b_k=a_k^2-a_{k-1}a_{k+1}$. So $(a_k)$ is log-concave if and only if $(b_k)$ is a nonnegative sequence. Call $(a_k)$ $\textit{infinitely log-concave}$ if $\mathcal{L}^i(a_k)$ is nonnegat...

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Bibliographic Details
Main Authors: Peter R. W. McNamara, Bruce E. Sagan
Format: Article
Language:English
Published: Discrete Mathematics & Theoretical Computer Science 2009-01-01
Series:Discrete Mathematics & Theoretical Computer Science
Subjects:
real roots
binomial coefficients
computer proof
gaussian polynomial
infinite log-concavity
symmetric functions
[math.math-co] mathematics [math]/combinatorics [math.co]
[info.info-dm] computer science [cs]/discrete mathematics [cs.dm]
Online Access:https://dmtcs.episciences.org/2678/pdf

Internet

https://dmtcs.episciences.org/2678/pdf

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