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Some Identities of Degenerate Bell Polynomials

Taekyun Kim, Dae San Kim, Han Young Kim, Jongkyum Kwon

2020Mathematics38 citationsDOIOpen Access PDF

Abstract

The new type degenerate of Bell polynomials and numbers were recently introduced, which are a degenerate version of Bell polynomials and numbers and are different from the previously introduced partially degenerate Bell polynomials and numbers. Several expressions and identities on those polynomials and numbers were obtained. In this paper, as a further investigation of the new type degenerate Bell polynomials, we derive several identities involving those degenerate Bell polynomials, Stirling numbers of the second kind and Carlitz’s degenerate Bernoulli or degenerate Euler polynomials. In addition, we obtain an identity connecting the degenerate Bell polynomials, Cauchy polynomials, Bernoulli numbers, Stirling numbers of the second kind and degenerate Stirling numbers of the second kind.

Topics & Concepts

Degenerate energy levelsBell polynomialsStirling numberStirling numbers of the second kindMathematicsDifference polynomialsWilson polynomialsPure mathematicsStirling numbers of the first kindHahn polynomialsBernoulli numberClassical orthogonal polynomialsOrthogonal polynomialsDiscrete orthogonal polynomialsAlgebra over a fieldDiscrete mathematicsGegenbauer polynomialsQuantum mechanicsPhysicsAdvanced Mathematical IdentitiesMathematical Inequalities and ApplicationsMathematical functions and polynomials