The Nirenberg problem of prescribed Gauss curvature on S2

Abstract

We introduce a new perspective on the classical Nirenberg problem of understanding the possible Gauss curvatures of metrics on S2 conformal to the round metric. A key tool is to employ the smooth Cheeger-Gromov compactness theorem to obtain general and essentially sharp a priori estimates for Gauss curvatures K contained in naturally defined stable regions. We prove that in such stable regions, the map u → Kg, g = e2ug+1 is a proper Fredholm map with well-defined degree on each component. This leads to a number of new existence and non-existence results. We also present a new proof and generalization of the Moser theorem on Gauss curvatures of even conformal metrics on S2. In contrast to previous work, the work here does not use any of the Sobolev-type inequalities of Trudinger-Moser-Aubin-Onofri.