Some results associated with Bernoulli and Euler numbers with applications

Abstract

In this paper, we present series representations of the remainders in the expansions for 2/(et+1), sech t and t. For example, we prove that for t > 0 and N∈N:=\1, 2, …\, \[sech\, t=Σj=0N-1E2j(2j)!t2j+RN(t) \] with \[ RN(t)=(-1)N2t2Nπ2N-1Σk=0∞(-1)k(k+12)2N-1(t2+π2(k+12)2), \] and \[sech\, t=Σj=0N-1E2j(2j)!t2j+(t, N)E2N(2N)!t2N \] with a suitable 0 < (t, N) < 1. Here En are the Euler numbers. By using the obtained results, we deduce some inequalities and completely monotonic functions associated with the ratio of gamma functions. Furthermore, we give a (presumably new) quadratic recurrence relation for the Bernoulli numbers.