Sobolev–Hardy space with general weight

AbstractIn this paper, it is defined the kth order Sobolev–Hardy space H0,k1(Ω,ϕ) with norm‖u‖1,k,ϕ={∫Ω[ϕ|∇u|2−ϕ∑i=1k(hi′hi)2u2]dx}1/2. Then the corresponding Poincaré inequality in this space is obtained, and the results are given that this space is embedded in L2NN−2 with weight ϕ−1|x|−2(N−1)Hk+1−(2+2NN−2) and in W01,q with weight ϕq/2 for 1⩽q