On the equation n1n2=n3n4 restricted to factor closed sets

Abstract

We study the number of solutions N(B,F) of the diophantine equation n1n2=n3n4, where 1 n1 B, 1 n3 B, n2, n4∈ F and F⊂ [1,B] is a factor closed set. We study more particularly the case when F= \m=p11… pkk, j∈ \0,1\, 1 j k\, p1,…,pk being distinct prime numbers.