Sections of functions and Sobolev type inequalities

Abstract

We study functions of two variables whose sections by the lines parallel to the coordinate axis satisfy Lipschitz condition of the order 0< 1. We prove that if for a function f the Lip - norms of these sections belong to the Lorentz space Lp,1() \,(p=1/), then f can be modified on a set of measure zero so as to become bounded and uniformly continuous on 2. For =1 this gives an extension of Sobolev's theorem on continuity of functions of the space W12,2(2). We show that the exterior Lp,1- norm cannot be replaced by a weaker Lorentz norm Lp,q with q>1.