Precise exponential decay for solutions of semilinear elliptic equations and its effect on the structure of the solution set for a real analytic nonlinearity

Abstract

We are concerned with the properties of weak solutions of the stationary Schr\"odinger equation - u + Vu = f(u), u∈ H1(RN) L∞(RN), where V is H\"older continuous and ∈f V>0. Assuming f to be continuous and bounded near 0 by a power function with exponent larger than 1 we provide precise decay estimates at infinity for solutions in terms of Green's function of the Schr\"odinger operator. In some cases this improves known theorems on the decay of solutions. If f is also real analytic on (0,∞) we obtain that the set of positive solutions is locally path connected. For a periodic potential V this implies that the standard variational functional has discrete critical values in the low energy range and that a compact isolated set of positive solutions exists, under additional assumptions.