A Generalization of the Calderón-Vaillancourt Theorem to Lp and hp

Let C p be the collection of real-valued functions f defined on E &p such that f is uniformly continuous on bounded subsets of Then C is a complete countably normed space equipped with the family [&}& , p : p=1, 2, 3, ...] of norms. In this paper it is shown that to every bounded linear functional

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

## Abstract We prove a model theoretic generalization of an extension of the Keisler‐Morley theorem for countable recursively saturated models of theories having a __κ__ ‐like model, where __κ__ is an inaccessible cardinal. (© 2007 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)