Ground states to a quasilinear Schr\"odinger equation with Berestycki-Lions type nonlinearities
Abstract
In this paper, we study the following quasilinear Schr\"odinger equation: \ arrayl - u - 2 ( u2) u = h( u) in RN, \\ u ∈ H1( RN), array. where N ≥ 3, > 0 is a parameter, and h satisfies Berestycki-Lions condition. By using a critical point theory on a topological manifold, we obtain the existence of a ground state for N ≥ 3, a nonradial ground state for N ≥ 4, and infinitely many nonradial solutions for N = 4 or N ≥ 6. Our results generalize several classical works into quasilinear equations.
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