On Coupled Dirac Systems under Boundary Condition

Abstract

In this article we study the existence of solutions for the Dirac systems equatione:0.1 \ arrayc Pu=∂ H∂ v(x,u,v) on \ M, Pv=∂ H∂ u(x,u,v) on \ M, BCHIu= BCHIv=0on \ ∂ M array . equation where M is an m-dimensional compact oriented Riemannian spin manifold with smooth boundary ∂ M, P is the Dirac operator under the boundary condition BCHIu= BCHIv=0 on ∂ M, u,v∈ C∞(M, M) are spinors. Using an analytic framework of proper products of fractional Sobolev spaces, the solutions existence results of the coupled Dirac systems are obtained for nonlinearity with superquadratic growth rates.