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《南京师大学报（自然科学版）》[ISSN:1001-4616/CN:32-1239/N]

Issue:

2016年03期

Page:

22-

Research Field:

·特约稿·

Publishing date:

Info

Title:

Classification of Solutions of Kantorovich Problems with Strictly Convex Norms

Author(s):

Chen Ping

School of Mathematics and Information Technology，Jiangsu Second Normal University，Nanjing 210013，China

Keywords:

strictly convex norm; optimal transport plans; classification; Kantorovich problem

PACS:

O174.12

DOI:

10.3969/j.issn.1001-4616.2016.03.004

Abstract:

The paper proposes a classification of solutions of Kantorovich problems with strictly convex norms. We prove a basic property theorem of any optimal plan on transport rays based on strict convexity of the norm. Then we show existence of solutions of the secondary variational problem，whose admissible set is a subset of the collection of all optimal transport plans for a given strictly convex norm. At last，we select different optimal transport plans by solving the secondary variational problem with different integrand functions which are either strictly convex or strictly concave. Furthermore，we prove that those selected optimal transport plans are either ray increasing or ray decreasing，that is we classify optimal transport plans according to ray monotonicity.

References:

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Memo

Memo:

-

Common functions

Last Update: 2016-09-30