Compositions with 3 Pairwise Coprime Parts

Abstract

How many ways can we write n as a sum of 3 positive integers, no pair of which share a common factor? We express this quantity in terms of the number of solutions to a certain class of linear Diophantine equations. This allows us to show that there are Πp n ( 1- 1p2 ) Πq n ( 1- 3q2 ) n22 + O(n3/2+o(1)) such compositions, where the products are over primes that respectively do and don't divide n. This strengthens the previous result of Bubbolini, Luca, and Spiga (arXiv:1202.1670)