English

Dwork-type supercongruences through a creative $q$-microscope

Number Theory 2020-11-30 v4 Algebraic Geometry Classical Analysis and ODEs Combinatorics Quantum Algebra

Abstract

We develop an analytical method to prove congruences of the type k=0(pr1)/dAkzkω(z)k=0(pr11)/dAkzpk(modpmrZp[[z]])for  r=1,2,, \sum_{k=0}^{(p^r-1)/d}A_kz^k \equiv \omega(z)\sum_{k=0}^{(p^{r-1}-1)/d}A_kz^{pk} \pmod{p^{mr}\mathbb Z_p[[z]]} \quad \text{for}\; r=1,2,\dots, for primes p>2p>2 and fixed integers m,d1m,d\ge1, where f(z)=k=0Akzkf(z)=\sum_{k=0}^\infty A_kz^k is an "arithmetic" hypergeometric series. Such congruences for m=d=1m=d=1 were introduced by Dwork in 1969 as a tool for pp-adic analytical continuation of f(z)f(z). Our proofs of several Dwork-type congruences corresponding to m2m\ge2 (in other words, supercongruences) are based on constructing and proving their suitable qq-analogues, which in turn have their own right for existence and potential for a qq-deformation of modular forms and of cohomology groups of algebraic varieties. Our method follows the principles of creative microscoping introduced by us to tackle r=1r=1 instances of such congruences; it is the first method capable of establishing the supercongruences of this type for general rr.

Cite

@article{arxiv.2001.02311,
  title  = {Dwork-type supercongruences through a creative $q$-microscope},
  author = {Victor J. W. Guo and Wadim Zudilin},
  journal= {arXiv preprint arXiv:2001.02311},
  year   = {2020}
}

Comments

34 pages

R2 v1 2026-06-23T13:05:31.146Z