The Lp Minkowski problem for polytopes for p&lt;0

Zhu, Guangxian

doi:10.1512/iumj.2017.66.6110

Cited by 65 publications

(41 citation statements)

References 19 publications

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“…We also note that if p ≤ 0 and µ is discrete such that any n elements of suppµ are independent vectors, then µ = S p (K, ·) = n · C p,n (P, ·) for some polytope P ∈ K n (o) according to Zhu [30,31]. In this paper, we first solve the discrete L p dual Minkowski problem if p > 1 and q > 0.…”

Section: Introductionmentioning

confidence: 99%

The L dual Minkowski problem for p > 1 and q > 0

Böröczky

Fodor

2019

Journal of Differential Equations

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General L p dual curvature measures have recently been introduced by Lutwak, Yang and Zhang [24]. These new measures unify several other geometric measures of the Brunn-Minkowski theory and the dual Brunn-Minkowski theory. L p dual curvature measures arise from qth dual inrinsic volumes by means of Alexandrov-type variational formulas. Lutwak, Yang and Zhang [24] formulated the L p dual Minkowski problem, which concerns the characterization of L p dual curvature measures.In this paper, we solve the existence part of the L p dual Minkowski problem for p > 1 and q > 0, and we also discuss the regularity of the solution.

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Section: Introductionmentioning

confidence: 99%

The L dual Minkowski problem for p > 1 and q > 0

Böröczky

Fodor

2019

Journal of Differential Equations

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“…However, as showed in, e.g. [59,60], the solutions to the L q Minkowski problems for discrete measures could be well-existed for q < 0. Finally, it seems intractable to find a direct relation between µ ∈ Ω and the solutions to the polar Minkowski problems, while such a relation usually can be established as long as the solutions exist for the related Minkowski problems.…”

Section: This Yields a Contradictionmentioning

confidence: 92%

“…In this case, especially if K ∈ K 0 , one can link µ to a convex body. However, it is not clear whether, in general, there exists a convex body K ∈ K 0 such that dµ = c · h 1−q K dS(K, ·) for q < 1; see special cases in [16,58,59,60]. In other words, µ ∈ Ω, although closely related to convex bodies, is in fact more general than the measures generated from convex bodies.…”

Section: This Yields a Contradictionmentioning

confidence: 99%

On the polar Orlicz-Minkowski problems and the p-capacitary Orlicz-Petty bodies

Luo¹

2020

Indiana Univ. Math. J.

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In this paper, we propose and study the polar Orlicz-Minkowski problems: under what conditions on a nonzero finite measure µ and a continuous function ϕ : (0, ∞) → (0, ∞), there exists a convex body K ∈ K 0 such that K is an optimizer of the following optimization problems:The solvability of the polar Orlicz-Minkowski problems is discussed under different conditions. In particular, under certain conditions on ϕ, the existence of a solution is proved for a nonzero finite measure µ on S n−1 which is not concentrated on any hemisphere of S n−1 . Another part of this paper deals with the p-capacitary Orlicz-Petty bodies. In particular, the existence of the p-capacitary Orlicz-Petty bodies is established and the continuity of the p-capacitary Orlicz-Petty bodies is proved.

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“…It has been proved in [34, Propositions 3.1 and 3.3] that the solutions to the polar Orlicz-Minkowski problem for discrete measures must be polytopes, the convex hulls of finite points in R n . It is well-known that all convex bodies can be approximated by polytopes, and hence to study the Minkowski type problems for discrete measures is very important and receives extensive attention, see e.g., [2,3,11,15,21,23,26,29,30,53,65,66,67].…”

Section: The General Dual-polar Orlicz-minkowski Problem For Discretementioning

confidence: 99%

On the general dual Orlicz-Minkowski problem

Xing¹,

Ye²

2020

Indiana Univ. Math. J.

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This paper gives a systematic study to the general dual-polar Orlicz-Minkowski problem (e.g., Problem 4.1). This problem involves the general dual volume V G (·) recently proposed in [13,15] in order to study the general dual Orlicz-Minkowski problem. As V G (·) extends the volume and the qth dual volume, the general dual-polar Orlicz-Minkowski problem is "polar" to the recently initiated general dual Orlicz-Minkowski problem in [13,15] and "dual" to the newly proposed polar Orlicz-Minkowski problem in [34]. The existence, continuity and uniqueness, if applicable, for the solutions to the general dual-polar Orlicz-Minkowski problem are established. Polytopal solutions and/or counterexamples to the general dual-polar Orlicz-Minkowski problem for discrete measures are also provided. Several variations of the general dual-polar Orlicz-Minkowski problem are discussed as well, in particular the one leading to the general Orlicz-Petty bodies.

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The Lp Minkowski problem for polytopes for p<0

Abstract: Abstract. Necessary and sufficient conditions are given for the existence of solutions to the discrete L p Minkowski problem for the critical case where 0 < p < 1.

Cited by 65 publications

References 19 publications

The L dual Minkowski problem for p > 1 and q > 0

The L dual Minkowski problem for p > 1 and q > 0

On the polar Orlicz-Minkowski problems and the p-capacitary Orlicz-Petty bodies

On the general dual Orlicz-Minkowski problem

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The Lp Minkowski problem for polytopes for p<0

Abstract: Abstract. Necessary and sufficient conditions are given for the existence of solutions to the discrete L p Minkowski problem for the critical case where 0 < p < 1.

Cited by 65 publications

References 19 publications

The L dual Minkowski problem for p > 1 and q > 0

The L dual Minkowski problem for p > 1 and q > 0

On the polar Orlicz-Minkowski problems and the p-capacitary Orlicz-Petty bodies

On the general dual Orlicz-Minkowski problem

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Product

Resources

About

The L dual Minkowski problem for p > 1 and q > 0

The L dual Minkowski problem for p > 1 and q > 0