Global regularity for the Yang-Mills equations on high dimensional Minkowski space

This monograph contains a study of the global Cauchy problem for the Yang-Mills equations on (6 1) and higher dimensional Minkowski space, when the initial data sets are small in the critical gauge covariant Sobolev space H (n 4)/2A. Regularity is obtained through a certain ""microlocal geometric renormalization"" of the equations which is implemented via a family of approximate null Croenstrom gauge transformations. The argument is then reduced to controlling some degenerate elliptic equations in high index and non-isotropic Lp spaces, and also proving some bilinear estimates in specially constructed square-function spaces.

Table of Contents Introduction Some gauge-theoretic preliminaries Reduction to the ""main a-priori estimate"" Some analytic preliminaries Proof of the main a-priori estimate Reduction to approximate half-wave operators Construction of the half-wave operators Fixed time L2 estimates for the parametrix The dispersive estimate Decomposable function spaces and some applications Completion of the proof Bibliography