Global Existence for a Nonlinear System with Fractional Laplacian in Banach Space

Abstract

We consider the cauchy problem for the fractional power dissipative equation ut+(- )β/2 u=F(u), where β>0 and F(u)=B(u, ...,u) and B is a multilinear form on a Banach space E. We show a global existence result assuming some properties of scaling degree of the multilinear form and the norm of the space E. We extend the ideas used for the treating of the equation to determine the global existence for the system ut+(-)β/2= F(v), vt+(- )β/2v=G(u) where F(u)=B1(u,...,u), G(v)=B2(v,...,v)