Generalized Lucas Theorem
Abstract
Let p be a prime. Let A and B, A B 0, be integers with base p expansions A = αiαi-1… α0 and B = βiβi-1… β0. Lucas proved that AB Πj=0j=iαjβj mod p. Similarly as proved by Kummer, the p-adic valuation vpAB is the number of borrows when computing A-B in base p, or the number of carries in (A-B)+B in base p. Davis and Webb discovered a generalization of Lucas's Theorem for prime powers. We prove a similar generalization in a different form using the concept of pseudo-digits.
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