Central Limit Theorems for Combinatorial Numbers Associated with Laguerre Polynomials

In this paper, we study limit theorems for numbers satisfying a class of triangular arrays, which are defined by a bivariate linear recurrence with bivariate linear coefficients. We obtain analytical expressions for the semi-exponential generating function of several classes of the numbers, includin...

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書目詳細資料
發表在:Mathematics
主要作者: Igoris Belovas
格式: Article
語言:英语
出版: MDPI AG 2022-03-01
主題:
limit theorems
combinatorial numbers
generating functions
asymptotic enumeration
asymptotic normality
Laguerre polynomials
在線閱讀:https://www.mdpi.com/2227-7390/10/6/865
實物特徵
總結:In this paper, we study limit theorems for numbers satisfying a class of triangular arrays, which are defined by a bivariate linear recurrence with bivariate linear coefficients. We obtain analytical expressions for the semi-exponential generating function of several classes of the numbers, including combinatorial numbers associated with Laguerre polynomials. We apply these results to prove the numbers’ asymptotic normality and specify the convergence rate to the limiting distribution.
ISSN:2227-7390

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