Well-poised basic q-Taylor expansions with complementary remainders and a two-basis kernel
摘要
We prove a nonterminating well-poised basic -Taylor expansion with complementary remainders for a two-basis infinite-product kernel implicitly proposed by the second author in \cite[Sec.~5]{Schlosser2008}. The well-poised parameter gives the rational basis, while the elliptic nome is a separate deformation; the infinite expansions treated here are specific to the basic case. We compute the two Taylor coefficient families and show that each one-family Taylor remainder tends to the complementary basis contribution. The proof uses the well-poised Cooper formula, Jackson's terminating summation, Rogers' summation, and theta interpolation, but not Bailey's nonterminating summation, which is recovered as a consequence. We also record two quadratic one-family examples and discuss a multi-kernel outlook.
引用
@article{arxiv.2605.26011,
title = {Well-poised basic q-Taylor expansions with complementary remainders and a two-basis kernel},
author = {Abdulhafeez A. Abdulsalam and Michael J. Schlosser},
journal= {arXiv preprint arXiv:2605.26011},
year = {2026}
}
备注
31 pages; second quadratic one-family example added; paper further polished