LOCAL WELLPOSEDNESS FOR THE 2+1-DIMENSIONAL MONOPOLE EQUATION

The space-time monopole equation on R(2+1) can be derived by a dimensional reduction of the antiselfdual Yang-Mills equations on R(2+2). It can be also viewed as the hyperbolic analog of Bogomolny equations. We uncover null forms in the nonlinearities and employ optimal bilinear estimates in the framework of wave-Sobolev spaces. As a result, we show the equation is locally wellposed in the Coulomb gauge for initial data sufficiently small in H(s) for s > 1/4