Numerical Integration on Graphs: where to sample and how to weigh

Abstract

Let G=(V,E,w) be a finite, connected graph with weighted edges. We are interested in the problem of finding a subset W ⊂ V of vertices and weights aw such that 1|V|Σv ∈ Vf(v) Σw ∈ Waw f(w) for functions f:V → R that are `smooth' with respect to the geometry of the graph. The main application are problems where f is known to somehow depend on the underlying graph but is expensive to evaluate on even a single vertex. We prove an inequality showing that the integration problem can be rewritten as a geometric problem (`the optimal packing of heat balls'). We discuss how one would construct approximate solutions of the heat ball packing problem; numerical examples demonstrate the efficiency of the method.