Decay estimates for solutions of nonlocal semilinear equations

Abstract

We investigate the decay for |x|→ ∞ of weak Sobolev type solutions of semilinear nonlocal equations Pu=F(u). We consider the case when P=p(D) is an elliptic Fourier multiplier with polyhomogeneous symbol p() and derive sharp algebraic decay estimates in terms of weighted Sobolev norms. In particular, we state a precise relation between the singularity of the symbol at the origin and the rate of decay of the corresponding solutions. Our basic example is the celebrated Benjamin-Ono equation equation BO(|D|+c)u=u2, c>0,equation for internal solitary waves of deep stratified fluids. Their profile presents algebraic decay, in strong contrast with the exponential decay for KdV shallow water waves.