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International Conference on Applicable General Topology
August 12-18, 2001
Hacettepe University
Ankara, Turkey

Organizers
L. M. Brown (Ankara), G. Brümmer (Cape Town), M. Diker (Ankara), M. Henriksen (Claremont), R. D. Kopperman (New York), G. M. Reed (Oxford), I. L. Reilly (Auckland), S. Salbany (Pretoria), D. Spreen (Siegen)

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Line Segments in the Space of Hurwitz Polynomials
by
Taner Büyükköroglu
Anadolu University, Eskisehir
Coauthors: Vakif Dzhafarov

Line Segments in the Space of Hurwitz Polynomials

Vakf Dzhafarov, Taner Büyükköroglu

Department of Mathematics, Faculty of Science, Anadolu University
Eski sehir 26470, Turkey

Every n-th order polynomial can be represented by an (n+1)-dimensional vector. The subset of Rn+1 generated by the Hurwitz stable polynomials is called the Hurwitz set of Rn+1 and is denoted by Hn

It is well known that Hn is not convex, but if all edges of a polytope lie inside of Hn, then the whole polytope is contained in Hn. Therefore, the investigation of line segments with end-points from Hn is of great importance. In this study we investigate such line segments. We give an algorithm which explains the segment behavior (in the sense of determining subsegments lying inside and outside of Hn) in the space Rn+1.

Date received: July 11, 2001

Copyright © 2001 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cagx-35.