Connection between bi s nomial coefficients and their analogs and symmetric functions | Zendy

Bazeniar Abdelghafour | Zendy; Moussa Ahmia | Zendy; Hacène Belbachir | Zendy

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Connection between bi s nomial coefficients and their analogs and symmetric functions

Author(s) -

Bazeniar Abdelghafour,

Moussa Ahmia,

Hacène Belbachir

Publication year - 2018

Publication title -

turkish journal of mathematics

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.454

H-Index - 27

eISSN - 1303-6149

pISSN - 1300-0098

DOI - 10.3906/mat-1705-27

Subject(s) - mathematics , connection (principal bundle) , pure mathematics , algebra over a field , mathematical analysis , geometry

In this paper, on one hand, we propose a new type of symmetric function to interpret the binomial coefficients and their analogs. On other hand, according to this function, we give an interpretation of these coefficients by lattice paths and tiling. Some identities of these coefficients are also established. This work is an extension of the results of Belbachir and Benmezai’s “A q -analogue for bi s nomial coefficients and generalized Fibonacci sequences”.

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