On Arithmetical Structures on Complete Graphs

Abstract

An arithmetical structure on the complete graph Kn with n vertices is given by a collection of n positive integers with no common factor each of which divides their sum. We show that, for all positive integers c less than a certain bound depending on n, there is an arithmetical structure on Kn with largest value c. We also show that, if each prime factor of c is greater than (n+1)2/4, there is no arithmetical structure on Kn with largest value c. We apply these results to study which prime numbers can occur as the largest value of an arithmetical structure on Kn.