Super congruences and Euler numbers

TL;DR

This paper establishes new super congruences involving Euler numbers and binomial coefficients, introduces a combinatorial approach, and proposes conjectures linking these congruences to series for pi and related constants.

Contribution

The paper presents novel super congruences related to Euler numbers using a combinatorial method and formulates multiple conjectures connecting these to series for pi and other constants.

Findings

Proved super congruences involving binomial sums and Euler numbers modulo prime powers.

Formulated numerous conjectures relating super congruences to Bernoulli and Euler numbers.

Proposed new series for pi^2, pi^{-2}, and constant K involving binomial coefficients.

Abstract

Let $p>3$ be a prime. We prove that $$\sum_{k=0}^{p-1}\binom{2k}{k}/2^k=(-1)^{(p-1)/2}-p^2E_{p-3} (mod p^3),$$ $$\sum_{k=1}^{(p-1)/2}\binom{2k}{k}/k=(-1)^{(p+1)/2}8/3*pE_{p-3} (mod p^2),$$ $$\sum_{k=0}^{(p-1)/2}\binom{2k}{k}^2/16^k=(-1)^{(p-1)/2}+p^2E_{p-3} (mod p^3)$$, where E_0,E_1,E_2,... are Euler numbers. Our new approach is of combinatorial nature. We also formulate many conjectures concerning super congruences and relate most of them to Euler numbers or Bernoulli numbers. Motivated by our investigation of super congruences, we also raise a conjecture on 7 new series for $\pi^2$, $\pi^{-2}$ and the constant $K:=\sum_{k>0}(k/3)/k^2$ (with (-) the Jacobi symbol), two of which are $$\sum_{k=1}^\infty(10k-3)8^k/(k^3\binom{2k}{k}^2\binom{3k}{k})=\pi^2/2$$ and $$\sum_{k>0}(15k-4)(-27)^{k-1}/(k^3\binom{2k}{k}^2\binom{3k}k)=K.$$