A Generalization of Szego's Theorem and the Power Theorem for Complex Interpolation

## Abstract For a simple graph of maximum degree Δ, it is always possible to color the edges with Δ + 1 colors (Vizing); furthermore, if the set of vertices of maximum degree is independent, Δ colors suffice (Fournier). In this article, we give a short constructive proof of an extension of these re

We raise a conjecture which would generalize Radon's theorem and would provide combinatorial proof for the result from [7], which generalizes Rado's theorem on general measure and the Ham sandwich theorem. We prove that the conjecture holds in several particular cases.

Let K = {Itl,. . . , k,} and L ={I1,. . . , Z,} be two sets of non-negative integers and assume ki > l j for every i , j . Let T be an L-intersecting family of subsets of a set of n elements. Assume the size of every set in T is a number from K. We conjecture that 1 ' f l 5 (: ). We prove that our c

A generalization of Blaschke's Rolling Theorem for not necessarily convex sets is proved that exhibits an intimate connection between a generalized notion of convexity, various concepts in mathematical morphology and image processing, and a certain smoothness condition. As a consequence a geometric