Uniqueness theorems for measures inLrandC0(Ω)

This paper gives a Sobolev-type embedding theorem for the generalized Lebesgue-Sobolev space , where is an open domain in R N N ≥ 2 with cone property, and p x is a Lipschitz continuous function defined on satisfying 1 < p -≤ p + < N k . The main result can be stated as follows: for any measurable

## Abstract Let __M__ be a CR manifold embedded in ℭ^__s__^ of arbitrary codimension. __M__ is called generic if the complex hull of the tangent space in all points of __M__ is the whole ℭ^__s__^. __M__ is minimal (in sense of Tumanov) in __p__ ϵ __M__ if there does not exist any CR submanifold of

Let Γ be a smooth curve in the plane R 2 , and Λ be any subset of R 2 . When can one recover uniquely a finite measure μ, supported by Γ and absolutely continuous with respect to the arc length measure on Γ , from the restriction to Λ of its Fourier transform? In this note we present two results in