Stern's type congruences for L(-k,\chi)

Hao Pan; Yong Zhang

arXiv:1101.4806·math.NT·April 30, 2013

Stern's type congruences for L(-k,\chi)

Hao Pan, Yong Zhang

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TL;DR

This paper establishes new congruences related to generalized Bernoulli numbers, extending Stern's classical results in number theory.

Contribution

It introduces several novel Stern's type congruences for generalized Bernoulli numbers, broadening the scope of existing number theoretic congruences.

Findings

01

Proved multiple Stern's type congruences for generalized Bernoulli numbers.

02

Extended classical congruences to more general settings.

03

Contributed new theoretical results to number theory.

Abstract

We prove several Stern's type congruences for generalized bernoulli numbers.

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Taxonomy

TopicsAdvanced Mathematical Identities · Advanced Combinatorial Mathematics · Algebraic structures and combinatorial models