Identities involving Bernoulli and Euler polynomials
Abstract
We present various identities involving the classical Bernoulli and Euler polynomials. Among others, we prove that Σk=0[n/4](-1)k n 4kBn-4k(z) 26k =12n+1Σk=0n (-1)k 1+ik(1+i)k n kBn-k(2z) and Σk=1n 22k-1 2n 2k-1 B2k-1(z) = Σk=1n k \, 22k 2n 2k E2k-1(z). Applications of our results lead to formulas for Bernoulli and Euler numbers, like, for instance, n En-1 =Σk=1[n/2] 22k-1k (22k-2n)n 2k-1 B2kBn-2k.
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