Normalized solutions to a class of (2,q)-Laplacian equations

Abstract

This paper concerns the existence of normalized solutions to a class of (2,q)-Laplacian equations in all the possible cases according to the value of p with respect to the critical exponent 2(1+2/N). In the L2-subcritical case, we study a global minimization problem and obtain a ground state solution. While in the L2-critical case, we prove several nonexistence results, extended also in the Lq-critical case. At last, we derive a ground state and infinitely many radial solutions in the L2-supercritical case. Compared with the classical Schr\"odinger equation, the (2,q)-Laplacian equation possesses a quasi-linear term, which brings in some new difficulties and requires a more subtle analysis technique. Moreover, the vector field a()=||q-2 corresponding to the q-Laplacian is not strictly monotone when q<2, so we shall consider separately the case q<2 and the case q>2.

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