Identities for generalized Euler polynomials
Abstract
For N ∈ N, let TN be the Chebyshev polynomial of the first kind. Expressions for the sequence of numbers p(N), defined as the coefficients in the expansion of 1/TN(1/z), are provided. These coefficients give formulas for the classical Euler polynomials in terms of the so-called generalized Euler polynomials. The proofs are based on a probabilistic interpretation of the generalized Euler polynomials recently given by Klebanov et al. Asymptotics of p(N) are also provided.
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