On the general dual Orlicz-Minkowski problem
Abstract
For a convex body with the origin in its interior, and a continuous function, define the general dual ( Orlicz quermassintegral of by Under certain conditions on , we prove a variational formula for the general dual ( Orlicz quermassintegral, which motivates the definition of , the general dual ( Orlicz curvature measure of . We pose the following general dual Orlicz-Minkowski problem: {\it Given a nonzero finite Borel measure defined on and a continuous function , can one find a constant and a convex body (ideally, containing in its interior), such that,} Based on the method of Lagrange multipliers and the established variational formula for the general dual ( Orlicz quermassintegral, a solution to the general dual Orlicz-Minkowski problem is provided. In some special cases, the uniqueness of solutions is proved and the solution for being a discrete measure is characterized.
Keywords
Cite
@article{arxiv.1802.06331,
title = {On the general dual Orlicz-Minkowski problem},
author = {Sudan Xing and Deping Ye},
journal= {arXiv preprint arXiv:1802.06331},
year = {2018}
}
Comments
This paper has been accepted by Indiana University Mathematics Journal