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Differences of Convex Compact Sets in the Space of Directed Sets. Part I: The Space of Directed Sets

Title data

Baier, Robert ; Farkhi, Elza M.:
Differences of Convex Compact Sets in the Space of Directed Sets. Part I: The Space of Directed Sets.
In: Set-Valued Analysis. Vol. 9 (2001) . - pp. 217-245.
ISSN 0927-6947
DOI: https://doi.org/10.1023/A:1012046027626

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Abstract in another language

A normed and partially ordered vector space of so-called `directed sets' is constructed, in which the convex cone of all nonempty convex compact sets in |R^n is embedded by a positively linear, order preserving and isometric embedding (with respect to a new metric stronger than the Hausdorff metric and equivalent to the Demyanov one). This space is a Banach and a Riesz space for all dimensions and a Banach lattice for n = 1. The directed sets in |R^n are parametrized by normal directions and defined recursively with respect to the dimension n by the help of a `support' function and directed `supporting faces' of lower dimension prescribing the boundary. The operations (addition, subtraction, scalar multiplication) are defined by acting separately on the `support' function and recursively on the directed `supporting faces'. Generalized intervals introduced by Kaucher form the basis of this recursive approach. Visualizations of directed sets will be presented in the second part of the paper.

Further data

Item Type: Article in a journal
Refereed: Yes
Additional notes: Contents:
1. Introduction
2. Preliminaries
2.1 Basic Notations
2.2 Comparison with Other Differences
3. Directed Intervals
3.1 Overview on Known Interval Operations
3.2 Basic Definitions and Operations of Directed Intervals
3.3 Properties of Directed Intervals
4. Directed Sets
4.1 Basic Definitions and Operations of Directed Sets
4.2 A New Metric in the Cone of Convex Compact Sets
4.3 Properties of Directed Sets
Keywords: Directed sets; Directed intervals; Differences of convex sets and their visualization; Embedding of convex compact sets into a vector space; Convex analysis; Interval analysis
Subject classification: Mathematics Subject Classification Code: 52A20 (26E25 54C60 65G30 49J53)
Institutions of the University: Faculties > Faculty of Mathematics, Physics und Computer Science
Faculties > Faculty of Mathematics, Physics und Computer Science > Department of Mathematics
Faculties > Faculty of Mathematics, Physics und Computer Science > Department of Mathematics > Chair Mathematics V (Applied Mathematics)
Faculties
Result of work at the UBT: Yes
DDC Subjects: 500 Science
500 Science > 510 Mathematics
Date Deposited: 23 Feb 2021 08:11
Last Modified: 13 Jun 2024 11:50
URI: https://eref.uni-bayreuth.de/id/eprint/63314