Random assignment problems on 2d manifolds

Abstract

We consider the assignment problem between two sets of N random points on a smooth, two-dimensional manifold of unit area. It is known that the average cost scales as E(N)12π N with a correction that is at most of order N N. In this paper, we show that, within the linearization approximation of the field-theoretical formulation of the problem, the first -dependent correction is on the constant term, and can be exactly computed from the spectrum of the Laplace--Beltrami operator on . We perform the explicit calculation of this constant for various families of surfaces, and compare our predictions with extensive numerics.