The first elements of the quotient of a numerical semigroup by a positive integer

Abstract

Given three pairwise coprime positive integers a1,a2,a3 ∈ Z+ we show the existence of a relation between the sets of the first elements of the three quotients ai,aj ak that can be made for every \i.j,k\=\1,2,3\. Then we use this result to give an improved version of Johnson's semi-explicit formula for the Frobenius number g(a1,a2,a3) without restriction on the choice of a1,a2,a3 and to give an explicit formula for a particular class of numerical semigroups.