Nonradial normalized solutions for nonlinear scalar field equations
Abstract
We study the following nonlinear scalar field equation - u=f(u)-μ u, u ∈ H1(RN) with \|u\|2L2(RN)=m. Here f∈ C(R,R), m>0 is a given constant and μ∈R is a Lagrange multiplier. In a mass subcritical case but under general assumptions on the nonlinearity f, we show the existence of one nonradial solution for any N≥4, and obtain multiple (sometimes infinitely many) nonradial solutions when N=4 or N≥6. In particular, all these solutions are sign-changing.
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