Karp's patching algorithm on dense digraph

Abstract

We consider the following question. We are given a dense digraph D with n vertices and minimum in- and out-degree at least α n, where α>1/2 is a constant. The edges E(D) of D are given independent edge costs C(e),e∈ E(D), such that (i) C has a density f that satisfies f(x)=a+bx+O(x2), for constants a>0,b as x 0 and such that in general either (ii) (C≥ x)≤ e- x for constants ,>0, or f(x)=0 for x> for some constant >0. Let C(i,j),i,j∈[n] be the associated n× n cost matrix where C(i,j)=∞ if (i,j) E. We show that w.h.p. (a small modification to) the patching algorithm of Karp finds a tour for the asymmetric traveling salesperson problem that is asymptotically equal to that of the associated assignment problem. The algorithm runs in polynomial time.