Global Sobolev regularity for nonvariational operators built with homogeneous H\"ormander vector fields

Abstract

We consider a class of nonvariational degenerate elliptic operators of the kind \[ Lu=Σi,j=1maij( x) XiXju \] where \ aij( x) \ i,j=1m is a symmetric uniformly positive matrix of bounded measurable functions defined in the whole Rn (n>m), possibly discontinuos but satisfying a VMO assumption, and X1,...,Xm are real smooth vector fields satisfying H\"ormander rank condition in the whole Rn and 1-homogeneous w.r.t. a family of nonisotropic dilations. We do not assume that the vector fields are left invariant w.r.t. an underlying Lie group of translations. We prove global WX2,p a-priori estimates, for every p∈( 1,∞) , of the kind: \[ uWX2,p(Rn)≤ c\ Lu Lp( Rn) + u Lp( Rn) \ \] for every u∈ WX2,p( Rn) . We also prove higher order estimates and corresponding regularity results: if aij∈ WXk,∞( Rn) , u∈ WX2,p( Rn) , Lu∈ WXk,p( Rn) , then u∈ WXk+2,p( Rn) and \[ uWXk+2,p(Rn)≤ c\ LuWXk,p(Rn)+ uLp(Rn )\ . \]

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