An energy constrained method for the existence of layered type solutions of NLS equations

Abstract

We study the existence of positive solutions on N+1 to semilinear elliptic equation - u+u=f(u) where N≥ 1 and f is modeled on the power case f(u)=|u|p-1u. Denoting with c the mountain pass level of (u)= 12\|u\|2H1(N)-∫NF(u)\, dx, u∈ H1(N) (F(s)=∫0sf(t)\, dt), we show, via a new energy constrained variational argument, that for any b∈ [0,c) there exists a positive bounded solution vb∈ C2(N+1) such that Evb(y)= 12\|∂yvb(·,y)\|2L2(N)-V(vb(·,y))=-b and v(x,y) 0 as |x|+∞ uniformly with respect to y∈. We also characterize the monotonicity, symmetry and periodicity properties of vb.