Partial Factorizations of Generalized Binomial Products

Abstract: This paper studies an integer sequence Gn analogous to the product Gn = n k=0 n k , the product of the elements of the n-th row of Pascal's triangle. It is known that Gn = p≤n p νp(Gn) with νp(Gn) being computable from the base p expansions of integers up to n. These radix statistics make sense for all bases b ≥ 2, and we define the generalized binomial product Gn = 2≤b≤n b ν(n,b) and show it is an integer. The statistic b ν(n,b) is not the same as the maximal power of b dividing Gn. This paper studies the par… Show more