Symmetry and Monotonicity of Positive Solutions to Schr\"odinger Systems with Fractional p-Laplacian

Abstract

In this paper, we first establish a narrow region principle and a decay at infinity theorem to extend the direct method of moving planes for general fractional p-Laplacian systems. By virtue of this method, we can investigate the qualitative properties of the following Schr\"odinger system with fractional p-Laplacian equation* \arrayr@\ \ c@\ \ ll (-)psu+aup-1& =&f(u,v), \\[0.05cm] (-)ptv+bvp-1& =&g(u,v), array. equation* where 0<s,\,t<1 and 2<p<∞. We obtain the radial symmetry in the unit ball or the whole space RN(N≥2), the monotonicity in the parabolic domain and the nonexistence on the half space for positive solutions to the above system under some suitable conditions on f and g, respectively.