Ordered Factorizations with k Factors
Abstract
We give an overview of combinatoric properties of the number of ordered k-factorizations fk(n,l) of an integer, where every factor is greater or equal to l. We show that for a large number k of factors, the value of the cumulative sum Fk(x,l)=Σn≤ x fk(n,l) is a polynomial in l x and give explicit expressions for the degree and the coefficients of this polynomial. An average order of the number of ordered factorizations for a fixed number k of factors greater or equal to 2 is derived from known results of the divisor problem.
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