A Continuous Analogue of Lattice Path Enumeration: Part II

T. Wakhare; C. Vignat

arXiv:1606.01986·math.NT·January 3, 2018·1 cites

A Continuous Analogue of Lattice Path Enumeration: Part II

T. Wakhare, C. Vignat

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TL;DR

This paper explores advanced properties of continuous binomial coefficients, extending the work of Cano and Diaz, and provides new mathematical results in the area of continuous lattice path enumeration.

Contribution

It introduces new results on continuous binomial coefficients, expanding the theoretical framework established by Cano and Diaz.

Findings

01

Additional properties of continuous binomial coefficients

02

Extended mathematical results in continuous lattice path enumeration

03

Deeper understanding of continuous analogue concepts

Abstract

Here are exhibited some additional results about the continuous binomial coefficients as introduced by L. Cano and R. Diaz in [1].

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Taxonomy

TopicsAdvanced Combinatorial Mathematics · Random Matrices and Applications · Markov Chains and Monte Carlo Methods