Rellich-Kondrachov type theorems on the half-space with general singular weights

Abstract

We prove Rellich-Kondrachov type theorems on the half-space HN+1=\(y, x) ∈ .R × RN: y>0\ endowed with the general weighted measure μw:=yc φ(|z|) d z, where c ∈ R and φ is a suitable Borel measurable function. We establish a necessary and sufficient characterization for the compactness of the immersion Hμw1(HN+1) Lμw2(HN+1). We prove that compactness holds if and only if the measure has finite mass and satisfies a "Global Tightness" condition, which we characterize via a coercive tail inequality (Lyapunov condition) and, in the singular case c ≤-1, a weighted Hardy inequality. These results generalize recent work on Gaussian weights to a broader class of radial potentials defined by abstract massvanishing conditions.