Global boundedness and normalized solutions to a p-Laplacian equation
Abstract
In the paper, we prove the existence of radial solutions to equation%main-eq-abstarct %aligned -p u+( sgn(p-s)+V(x))|u|p-2u+λ |u|s-2u=|u|q-2u\,N \\ %∫N|u|sdx&=s %aligned equation with prescribed Ls(N)-norm, where N 3,\,p∈[2,N),\,s∈(1,p],\,q∈(pN+sN,NpN-p) and V:N is a suitable radial potential. We stress that V is required to be radial but not necessarily bounded, and there are no assumptions about its sign. The case V 0 is also included. The proof is variational and relies on a min-max argument. A key-tool is the Pohozaev identity, which is shown to be true for any solution under quite weak assumptions about the potential V. This identity is proved with the aid of a new global boundedness result for subsolutions to a suitable p-Laplace equation.
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