Nodal solutions for quasilinear Schr\"odinger equations with asymptotically 3-linear nonlinearity

Abstract

In this paper, we are concerned with the quasilinear Schr\"odinger equation equation* - u+V(x)u-u(u2)=g(u),\ \ x∈ RN, equation* where N≥3, V is radially symmetric and nonnegative, and g is asymptotically 3-linear at infinity. In the case of ∈fRNV>0, we show the existence of a least energy sign-changing solution with exactly one node, and for any integer k>0, there are a pair of sign-changing solutions with k nodes. Moreover, in the case of ∈fRNV=0, the problem above admits a least energy sign-changing solution with exactly one node. The proof is based on variational methods. In particular, some new tricks and the method of sign-changing Nehari manifold depending on a suitable restricted set are introduced to overcome the difficulty resulting from the appearance of asymptotically 3-linear nonlinearities.

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