等级偏差和曲柄调制 11

Nikolay E. Borozenets
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引用次数: 0

摘要

在本文中,我们以弗兰克-加文(Frank Garvan)和里沙布-萨尔马(Rishabh Sarma)的最新成果以及布鲁斯-伯恩特(Bruce Berndt)的经典成果为基础,建立了秩和曲柄模 11 的偏差的 11 剖分。利用我们的新剖分,我们重新推导了加文、阿特金、斯温纳顿-戴尔、侯赛因、埃金和切尔恩的结果。通过开发和利用 Theta 函数商的正性条件,我们还将证明新的秩秩不等式,并提出几个猜想,其中一个猜想最近由卡特琳-布林曼和巴德里-维沙尔-潘迪解决了。对于我们方法的其他应用,我们还将在本文中证明秩矩以及安德鲁斯最小部分函数和爱森斯坦级数的新同余式。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Deviation of the rank and crank modulo 11

In this paper, we build on the recent results of Frank Garvan and Rishabh Sarma as well as classical results of Bruce Berndt in order to establish the 11-dissection of the deviations of the rank and crank modulo 11. Using our new dissections, we re-derive the results of Garvan, Atkin, Swinnerton-Dyer, Hussain, Ekin and Chern. By developing and exploiting positivity conditions for quotients of theta functions, we will also prove new rank–crank inequalities and make several conjectures, one of which was recently solved by Kathrin Bringmann and Badri Vishal Pandey. For other applications of our methods, in this paper, we will also prove new congruences for rank moments as well as the Andrews’ smallest parts function and Eisenstein series.

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