Symmetry of solutions to higher and fractional order semilinear equations on hyperbolic spaces

Abstract

We show that nontrivial solutions to higher and fractional order equations with certain nonlinearity are radially symmetric and nonincreasing on geodesic balls in the hyperbolic space Hn as well as on the entire space Hn. Applying the Helgason-Fourier analysis techniques on Hn, we develop a moving plane approach for integral equations on Hn. We also establish the symmetry to solutions of certain equations with singular terms on Euclidean spaces. Moreover, we obtain symmetry to solutions of some semilinear equations involving fractional order derivatives.