A novel approach for obtaining new identities for the lambda extension of q-Euler polynomials arising from the q-umbral calculus | Zendy

Serkan Aracı | Zendy; Mehmet Açíkgöz | Zendy; Toka Diagana | Zendy; H. M. Srivastava | Zendy

Open Access

A novel approach for obtaining new identities for the lambda extension of q-Euler polynomials arising from the q-umbral calculus

Author(s) -

Serkan Aracı,

Mehmet Açíkgöz,

Toka Diagana,

H. M. Srivastava

Publication year - 2017

Publication title -

the journal of nonlinear sciences and applications

Language(s) - English

Resource type - Journals

eISSN - 2008-1901

pISSN - 2008-1898

DOI - 10.22436/jnsa.010.04.03

Subject(s) - mathematics , extension (predicate logic) , lambda , euler's formula , calculus (dental) , pure mathematics , algebra over a field , mathematical analysis , computer science , medicine , physics , dentistry , programming language , optics

In this article, a new q-generalization of the Apostol-Euler polynomials is introduced using the usual q-exponential function. We make use of such a generalization to derive several properties arising from the q-umbral calculus. c ©2017 All rights reserved.

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