Combinatorial congruences modulo prime powers
Abstract
Let p be any prime, and let a and n be nonnegative integers. Let r∈ Z and f(x)∈ Z[x]. We establish the congruence p fΣk=r(mod pa)nk(-1)k f((k-r)/pa) =0 (mod pΣi=a∞[n/pi]) (motivated by a conjecture arising from algebraic topology), and obtain the following vast generalization of Lucas' theorem: If a is greater than one, and l,s,t are nonnegative integers with s,t<p, then 1[n/pa-1]! Σk=r(mod pa) pn+spk+t(-1)pk((k-r)/pa-1)l = 1[n/pa-1]! Σk=r(mod pa)nkst(-1)k((k-r)/pa-1)l (mod p). We also present an application of the first congruence to Bernoulli polynomials, and apply the second congruence to show that a p-adic order bound given by the authors in a previous paper can be attained when p=2.
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