A lattice-theoretic approach to the Bourque-Ligh conjecture

Abstract

The Bourque-Ligh conjecture states that if S=\x1,x2,…,xn\ is a gcd-closed set of positive integers with distinct elements, then the LCM matrix [S]=[lcm(xi,xj)] is invertible. It is well known that this conjecture holds for n≤7 but does not generally hold for n≥8. In this paper we provide a lattice-theoretic explanation for this solution of the Bourque-Ligh conjecture. In fact, let (P,≤)=(P,,) be a lattice, let S=\x1,x2,…,xn\ be a subset of P and let f:P C be a function. We study under which conditions the join matrix [S]f=[f(xi xj)] on S with respect to f is invertible on a meet closed set S (i.e., xi,xj∈ S⇒ xi xj∈ S).