On semilinear Grushin--Schr\"odinger equation in RN
Abstract
We establish the existence of nontrivial nonnegative weak solutions to the following equation equation* -γ u + V(z)u = Q(z)f(u), z∈ RN, equation* where γ denotes the so-called Grushin-type operator in RN. The potentials V and Q are assumed to be controlled below and above, respectively, by functions of type (1+|z|)a, a∈R. The main result is the embedded of the space EVγ into the weighted Lebesgue space LQp(RN), under suitable conditions. Finally, we derive regularity results for the obtained weak solutions.
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