Uniqueness and Nondegeneracy of ground states of - u + (-)s u+u = up+1 in Rn when s is close to 0 and 1

Abstract

We are concerned with the mixed local/nonlocal Schr\"odinger equation equation - u + (-)s u+u = up+1 in Rn, equation for arbitrary space dimension n≥slant1, s∈(0,1), and p∈(0,2*-2) with 2* the critical Sobolev exponent. We provide the existence and several fundamental properties of nonnegative solutions for the above equation. And then, we prove that, if s is close to 0 and 1, respectively, such equation then possesses a unique (up to translations) ground state, which is nondegenerate.

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