Asymptotic theory of C-pseudo-cones
Abstract
In this paper, we study the non-degenerated C-pseudo-cones which can be uniquely decomposed into the sum of a C-asymptotic set and a C-starting point. Combining this with the novel work in Schneider-AweightedMinkowskitheorem, we introduce the asymptotic weighted co-volume functional T(E) of the non-degenerated C-pseudo-cone E, which is also a generalized function with the singular point o (the origin). Using our convolution formula for T(E), we establish a decay estimate for T(E) at infinity and present some interesting results. As applications of this asymptotic theory, we prove a weighted Brunn-Minkowski type inequality and study the solutions to the weighted Minkowski problem for pseudo-cones. Moreover, we pose an open problem regarding T(E), which we call the asymptotic Brunn-Minkowski inequality for C-pseudo-cones.
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