Lucas-type congruences for cyclotomic -coefficients
Abstract
Let p be any prime and a be a positive integer. For nonnegative integers l,n and an integer r, the normalized cyclotomic -coefficient n,rl,pa:=p-[(n-pa-1-lpa)/(pa-1(p-1))] Σk=r(mod pa)(-1)kn k(k-r)/pa l is known to be an integer. In this paper, we show that this coefficient behaves like binomial coefficients and satisfies some Lucas-type congruences. This implies that a congruence of Wan is often optimal, and two conjectures of Sun and Davis are true.
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