The factorial function and generalizations, extended
Abstract
This paper presents an extension of Bhargava's theory of factorials associated to any nonempty subset S of Z. Bhargava's factorials k!S are invariants, constructed using the notion of p-orderings of S where p is a prime. This paper defines b-orderings of any nonempty subset S of Z for all integers b2, as well as "extreme" cases b=1 and b=0. It defines generalized factorials k !S,T and generalized binomial coefficients k+kS,T as nonnegative integers, for all nonempty S and allowing only b in T⊂eqN. It computes b-ordering invariants when S is Z and when S is the set of all primes.
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