Gaussian Poincar\'e inequalities on the half-space with singular weights
Abstract
We prove Rellich-Kondrachov type theorems and weighted Poincar\'e inequalities on the half-space RN+1+=\z=(x,y): x ∈ RN, y>0\ endowed with the weighted Gaussian measure μ :=yce-a|z|2dz where c+1>0 and a>0. We prove that for some positive constant C>0 one has align* \|u- u\|L2μ(RN+1+)≤ C \|∇ u\|L2μ (RN+1+), ∀ u∈ H1μ(RN+1+) align* where u= 1μ(RN+1+)∫RN+1+ u\,dμ(z). Besides this we also consider the local case of bounded domains of RN+1+ where the measure μ is ycdz.
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