Sums of generalized polygonal numbers of almost prime "length"
Abstract
In this paper, we consider sums of three generalized m-gonal numbers whose parameters are restricted to integers with a bounded number of prime divisors. With some restrictions on m modulo 30, we show that a density one set of integers is represented as such a sum, where the parameters are restricted to have at most 6361 prime factors. Moreover, if the squarefree part of fm(n) is sufficiently large, then n is represented as such a sum, where fm(n) is a natural linear function in n.
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