Almost critical local well-posedness for the space-time Monopole equation in Lorenz gauge

Abstract

Recently, Candy and Bournaveas proved local well-posedness of the space-time monopole equation in Lorenz gauge for initial data in Hs with s>14. The equation is L2-critical, and hence a 14 derivative gap is left between their result and the scaling prediction. In this paper, we consider initial data in the Fourier-Lebesgue space Hps for 1<p 2 which coincides with Hs when p=2 but scales like lower regularity Sobolev spaces for 1<p< 2. In particular, we will see that as p→ 1+, the critical exponent scp→ 1-, in which case H1+1- is the critical space. We shall prove almost optimal local well-posedness to the space-time monopole equation in Lorenz gauge with initial data in the aforementioned spaces that correspond to p close to 1.