Hessian curvature hypersurfaces with prescribed Gauss image

Abstract

In this paper, we investigate Hessian curvature hypersurfaces with prescribed Gauss images. Given geodesically strictly convex bounded domains in Rn and in the unit hemisphere, we prove that there is a strictly convex graphic hypersurface defined in with prescribed k-Hessian curvatures such that its Gauss image is . Our proof relies on a novel C2 boundary estimate which utilizes the orthogonal invariance of hypersurfaces. Indeed, we employ some special vector fields generated by the infinitesimal rotations in Rn+1 to establish the boundary C2 estimates. This new approach enables us to handle the additional negative terms that arise when taking second order derivatives near the boundary.

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