超几何周期-逼近的鬼影与同余

Pub Date : 2021-07-18 DOI:10.1017/S1446788723000083

A. Varchenko, W. Zudilin

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引用次数: 1

摘要

我们证明了劳伦多项式元组上常数项的一般dwork型同余。我们将这一结果应用于建立由超几何和Knizhnik-Zamolodchikov (KZ)方程的模$p^s$的多项式解所产生的函数的算术和p进解析性质，其解是主多项式的系数，且系数为整数。作为一个应用，我们证明了p进KZ连接的最简单例子有一个不变的线子束，而它的复杂类比由于其单一性表示的不可约性而没有非平凡子束。

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GHOSTS AND CONGRUENCES FOR -APPROXIMATIONS OF HYPERGEOMETRIC PERIODS

We prove general Dwork-type congruences for constant terms attached to tuples of Laurent polynomials. We apply this result to establishing arithmetic and p-adic analytic properties of functions originating from polynomial solutions modulo $p^s$ of hypergeometric and Knizhnik–Zamolodchikov (KZ) equations, solutions which come as coefficients of master polynomials and whose coefficients are integers. As an application, we show that the simplest example of a p-adic KZ connection has an invariant line subbundle while its complex analog has no nontrivial subbundles due to the irreducibility of its monodromy representation.

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