Admissible function spaces for weighted Sobolev inequalities

Abstract

Let k,N ∈ N with 1 k N and let =1 × 2 be an open set in Rk × RN-k. For p∈ (1,∞) and q ∈ (0,∞), we consider the following Hardy-Sobolev type inequality: align ∫ |g1(y)g2(z)| |u(y,z)|q \, dy \, dz ≤ C ( ∫ | ∇ u(y,z) |p \, dy \, dz )qp, ∀ \, u ∈ C1c(), align for some C>0. Depending on the values of N,k,p,q, we have identified various pairs of Lorentz spaces, Lorentz-Zygmund spaces and weighted Lebesgue spaces for (g1, g2) so that the above inequality holds. Furthermore, we give a sufficient condition on g1,g2 so that the best constant in the above inequality is attained in the Beppo-Levi space D1,p0()-the completion of C1c() with respect to \|∇ u\|Lp().