Fractional Sobolev extension and imbedding

We establish a connection between the Sobolev imbedding theorem and the extendability of Sobolev functions. As applications we give geometric criteria for extendability and give a result on the dependence of the extension property on the exponent p. ## 1998 Academic Press Theorem A. Suppose that W

The aim of this wok is to show how the weak compactness in the L 1 (X, m) space may be used to relate the existence of a Sobolev Orlicz imbedding to the L 2 (X, m)spectral properties of an operator H. In the first part we show that a Sobolev Orlicz imbedding implies that the bottom of the L 2 -spect

Consider the Sobolev class W s, p (M, N ) where M and N are compact manifolds, and p ≥ 1, s ∈ (0, 1 + 1/ p). We present a necessary and sufficient condition for two maps u and v in W s, p (M, N ) to be continuously connected in W s, p (M, N ). We also discuss the problem of connecting a map u ∈ W s,