The dual Minkowski problem for q-torsional rigidity
Abstract
The Minkowski problem for torsional rigidity (2-torsional rigidity) was firstly studied by Colesanti and Fimiani CA using variational method. Moreover, Hu HJ00 also studied this problem by the method of curvature flows and obtained the existence of smooth even solutions. In addition, the smooth non-even solutions to the Orlicz Minkowski problem w. r. t q-torsional rigidity were given by Zhao et al. ZX through a Gauss curvature flow. The dual curvature measure and the dual Minkowski problem were first posed and considered by Huang, Lutwak, Yang and Zhang in HY. The dual Minkowski problem is a very important problem, which has greatly contributed to the development of the dual Brunn-Minkowski theory and extended the other types dual Minkowski problem. To the best of our knowledge, the dual Minkowski problem w. r. t (q) torsional rigidity is still open because the dual (q) torsional measure is blank. Thus, it is a natural problem to consider the dual Minkowski problem for (q) torsional rigidity. In this paper, we introduce the p-th dual q-torsional measure and propose the p-th dual Minkowski problem for q-torsional rigidity with q>1. Then we confirm the existence of smooth even solutions for p<n (p≠ 0) to the p-th dual Minkowski problem for q-torsional rigidity by method of a Gauss curvature flow. Specially, we also obtain the smooth non-even solutions with p<0 to this problem.
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