An Explicit Description of Extreme Points of the Set of Couplings with Given Marginals: with Application to Minimum-Entropy Coupling Problems

Abstract

Given probability distributions p=(p1,p2,…,pm) and q=(q1,q2,…, qn) with m,n≥ 2, denote by C( p,q) the set of all couplings of p,q, a convex subset of mn. Denote by Ce( p, q) the finite set of all extreme points of C( p,q). It is well known that, as a strictly concave function, the Shannan entropy H on C( p,q) takes its minimal value in Ce( p, q). In this paper, first, the detailed structure of Ce( p, q) is well specified and all extreme points are enumerated by a special algorithm. As an application, the exact solution of the minimum-entropy coupling problem is obtained. Second, it is proved that for any strict Schur-concave function on C( p,q), also takes its minimal value on Ce( p, q). As an application, the exact solution of the minimum-entropy coupling problem is obtained for (,)-entropy, a large class of entropy including Shannon entropy, R\'enyi entropy and Tsallis entropy etc. Finally, all the above are generalized to multi-marginal case.