Extensions of Stern's congruence for Euler numbers
Abstract
For a nonzero integer a let En(a) be given by Σk=0[n/2] n2ka2kEn-2k(a)=(1-a)n (n=0,1,2,...), where [x] is the greatest integer not exceeding x. As En(1)=En is the Euler number, En(a) can be viewed as a generalization of Euler numbers. Let k and m be positive integers, and let b be a nonnegative integer. In this paper, we determine E2mk+b(a) modulo 2m+10 for m 5. For m 5 we also establish congruences for Uk(5m)+b,\; Ek(5m)+b,\; Sk(5m)+b5m+5 and Sk(3m)+b3m+5, where U2n=E2n(3/2), Sn=En(2) and (n) is Euler's function.
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