On the congruences of Eisenstein series with polynomial indexes

Su Hu; Min-Soo Kim; Min Sha

arXiv:1805.09225·math.NT·June 22, 2021

On the congruences of Eisenstein series with polynomial indexes

Su Hu, Min-Soo Kim, Min Sha

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TL;DR

This paper establishes a broad family of congruences for Eisenstein series with polynomial indexes, generalizing classical results and introducing new congruences using Serre's $p$-adic Eisenstein series framework.

Contribution

It extends classical Eisenstein series congruences to a general polynomial index setting, providing new congruences via Serre's $p$-adic families.

Findings

01

General family of Eisenstein series congruences proved

02

Includes classical von Staudt-Clausen and Kummer congruences as special cases

03

Derives new congruences for Eisenstein series

Abstract

In this paper, based on Serre's $p$ -adic family of Eisenstein series, we prove a general family of congruences for Eisenstein series $G_{k}$ in the form $i = 1 \sum n g_{i} (p) G_{f_{i} (p)} \equiv g_{0} (p) mod p^{N},$ where $f_{1} (t), \dots, f_{n} (t) \in Z [t]$ are non-constant integer polynomials with positive leading coefficients and $g_{0} (t), \dots, g_{n} (t) \in Q (t)$ are rational functions. This generalizes the classical von Staudt-Clausen's and Kummer's congruences of Eisenstein series, and also yields some new congruences.

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Taxonomy

TopicsAdvanced Mathematical Identities · Analytic Number Theory Research · Advanced Algebra and Geometry