English

A $q$-microscope for supercongruences

Number Theory 2019-02-14 v6 Classical Analysis and ODEs Combinatorics Quantum Algebra

Abstract

By examining asymptotic behavior of certain infinite basic (qq-) hypergeometric sums at roots of unity (that is, at a "qq-microscopic" level) we prove polynomial congruences for their truncations. The latter reduce to non-trivial (super)congruences for truncated ordinary hypergeometric sums, which have been observed numerically and proven rarely. A typical example includes derivation, from a qq-analogue of Ramanujan's formula n=0(4n2n)(2nn)228n32n(8n+1)=23π, \sum_{n=0}^\infty\frac{\binom{4n}{2n}{\binom{2n}{n}}^2}{2^{8n}3^{2n}}\,(8n+1) =\frac{2\sqrt{3}}{\pi}, of the two supercongruences S(p1)p(3p)(modp3)andS(p12)p(3p)(modp3), S(p-1)\equiv p\biggl(\frac{-3}p\biggr)\pmod{p^3} \quad\text{and}\quad S\Bigl(\frac{p-1}2\Bigr) \equiv p\biggl(\frac{-3}p\biggr)\pmod{p^3}, valid for all primes p>3p>3, where S(N)S(N) denotes the truncation of the infinite sum at the NN-th place and (3)(\frac{-3}{\cdot}) stands for the quadratic character modulo 33.

Keywords

Cite

@article{arxiv.1803.01830,
  title  = {A $q$-microscope for supercongruences},
  author = {Victor J. W. Guo and Wadim Zudilin},
  journal= {arXiv preprint arXiv:1803.01830},
  year   = {2019}
}

Comments

26 pages

R2 v1 2026-06-23T00:42:48.774Z