The existence of (p, k)-convex hypersurfaces for a class of Hessian quotient type curvature equations

Abstract

This article investigates the existence of closed, star-shaped hypersurfaces for a class of Hessian quotient type curvature equations, in which the operator σkσl() arising in these equations can be viewed as a generalization of the classical Hessian quotient operator. By combining a priori estimates with the continuity method, we establish the existence and uniqueness of (p, k)-convex hypersurfaces for both nonhomogeneous and homogeneous equations of this type. Furthermore, by exploiting the recently discovered ``inverse convexity'' property of the operator σkσl(), we prove a constant rank theorem and thereby obtain the existence and uniqueness of strictly convex solutions to these curvature equations.