On Laplacian Monopoles

Abstract

We consider the action of the (combinatorial) Laplacian of a finite and simple graph on integer vectors. By a Laplacian monopole we mean an image vector negative at exactly one coordinate associated with a vertex. We consider a numerical semigroup Hf(P) given by all monopoles at a vertex of a graph. The well-known analogy between finite graphs and algebraic curves (Riemann surfaces) has motivated much work. More specifically for us, the motivation arises out of the classical Weierstrass semigroup of a rational point on a curve whose properties are tied to the Riemann-Roch Theorem, as well as out of the graph theoretic Riemann-Roch Theorem demonstrated by Baker and Norine. We determine Hf(P) for some families of graphs and demonstrate a connection between Hf(P) and the vertex (also edge) connectivity of a graph. We also study Hr(P), another numerical semigroup which arises out of the result of Baker and Norine, and explore its connection to Hf(P) on graphs. We show that Hr(P)⊂eq Hf(P) in a number of special cases. In contrast to the situation in the classical setting, we demonstrate that Hf(P) Hr(P) can be arbitrarily large and identify a potential obstruction to the inclusion of Hr(P) in Hf(P) in general, though we still conjecture this inclusion. We conclude with a few open questions.