On the prescribing σ2 curvature equation on S4

Abstract

Prescribing σk curvature equations are fully nonlinear generalizations of the prescribing Gaussian or scalar curvature equations. Given a positive function K to be prescribed on the 4-dimensional round sphere. We obtain asymptotic profile analysis for potentially blowing up solutions to the σ2 curvature equation with the given K; and rule out the possibility of blowing up solutions when K satisfies a non-degeneracy condition. We also prove uniform a priori estimates for solutions to a family of σ2 curvature equations deforming K to a positive constant under the same non-degeneracy condition on K, and prove the existence of a solution using degree argument to this deformation involving fully nonlinear elliptic operators under an additional, natural degree condition on a finite dimensional map associated with K.