Some $q$-supercongruences from transformation formulas for basic hypergeometric series
Abstract
Several new -supercongruences are obtained using transformation formulas for basic hypergeometric series, together with various techniques such as suitably combining terms, and creative microscoping, a method recently developed by the first author in collaboration with Wadim Zudilin. More concretely, the results in this paper include -analogues of supercongruences (referring to -adic identities remaining valid for some higher power of ) established by Long, by Long and Ramakrishna, and several other -supercongruences. The six basic hypergeometric transformation formulas which are made use of are Watson's transformation, a quadratic transformation of Rahman, a cubic transformation of Gasper and Rahman, a quartic transformation of Gasper and Rahman, a double series transformation of Ismail, Rahman and Suslov, and a new transformation formula for a nonterminating very-well-poised series. Also, the nonterminating -Dixon summation formula is used. A special case of the new transformation formula is further utilized to obtain a generalization of Rogers' linearization formula for the continuous -ultraspherical polynomials.
Cite
@article{arxiv.1812.06324,
title = {Some $q$-supercongruences from transformation formulas for basic hypergeometric series},
author = {Victor J. W. Guo and Michael J. Schlosser},
journal= {arXiv preprint arXiv:1812.06324},
year = {2020}
}
Comments
41 pages, Section 6 slightly expanded; to appear in Constructive Approximation