A generalization of the Ahlswede-Daykin inequality

Given a finite boolean lattice L and four functions tr, fl, y, 6 of L to the nonnegative reals with oc(x)fl(y) <~ y(x v y)6(x A y) for all x, y e L. We show that Here x' denotes the complement of x and X v X' stands for {Xl v x~ I xl, x2 e X). This inequality turns out to be equivalent in a certain

Consider two set systems A and B in the powerset P(n) with the property that for each A # A there exists a unique B # B such that A/B. Ahlswede and Cai proved an inequality about such systems which is a generalization of the LYM and Bolloba s inequalities. In this paper we characterize the structure

In this paper, we generalize the well-known Holder inequality and give a condition at which the equality holds.

In this paper we are concerned with the following conjecture. Conjecture: Let L be a collection of k positive integers and In particular, we show this conjecture is true when L consists of k consecutive positive integers. This generalizes a well-known inequality of Fisher's. Our proof simplifies an