A weighted Minkowski theorem for pseudo-cones
Abstract
A nonempty closed convex set in Rn, not containing the origin, is called a pseudo-cone if with every x it also contains λ x for x 1. We consider pseudo-cones with a given recession cone C, called C-pseudo-cones. The family of C-pseudo-cones can, with reasonable justification, be considered as a counterpart to the family of convex bodies containing the origin in the interior. For a C-pseudo-cone one can naturally define a surface area measure and a covolume. Since they are in general infinite, we introduce a weighting, leading to modified versions of surface area and covolume. These are finite and still homogeneous, though of different degrees. Our main result is a Minkowski type existence theorem for C-pseudo-cones with given weighted surface area measure.
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