Conditional Information Inequalities and Combinatorial Applications

Abstract

We show that the inequality H(A B,X) + H(A B,Y) H(A B) for jointly distributed random variables A,B,X,Y, which does not hold in general case, holds under some natural condition on the support of the probability distribution of A,B,X,Y. This result generalizes a version of the conditional Ingleton inequality: if for some distribution I(X: Y A) = H(A X,Y)=0, then I(A : B) I(A : B X) + I(A: B Y) + I(X : Y). We present two applications of our result. The first one is the following easy-to-formulate combinatorial theorem: assume that the edges of a bipartite graph are partitioned into K matchings such that for each pair (left vertex x, right vertex y) there is at most one matching in the partition involving both x and y; assume further that the degree of each left vertex is at least L and the degree of each right vertex is at least R. Then K LR. The second application is a new method to prove lower bounds for biclique coverings of bipartite graphs.