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Article

Keywords:
discrete event systems; order-preserving homogeneous maps
Summary:
Maps $f$ defined on the interior of the standard non-negative cone $K$ in ${\mathbb{R}}^N$ which are both homogeneous of degree $1$ and order-preserving arise naturally in the study of certain classes of Discrete Event Systems. Such maps are non-expanding in Thompson’s part metric and continuous on the interior of the cone. It follows from more general results presented here that all such maps have a homogeneous order-preserving continuous extension to the whole cone. It follows that the extension must have at least one eigenvector in $K-\lbrace 0\rbrace $. In the case where the cycle time $\chi (f)$ of the original map does not exist, such eigenvectors must lie in $\partial {K}-\lbrace 0\rbrace $.
References:
[1] Burbanks A. D., Nussbaum R. D., Sparrow C. T.: Extension of order-preserving maps on a cone. Proc. Roy. Soc. Edinburgh Sect. A 133 (2003), 35–59 MR 1960046 | Zbl 1048.47040
[2] Burbanks A. D., Sparrow C. T.: All Monotone Homogeneous Functions (on the Positive Cone) Admit Continuous Extension. Technical Report No. 1999-13, Statistical Laboratory, University of Cambridge 1999
[3] Crandall M. G., Tartar L.: Some relations between nonexpansive and order preserving mappings. Proc. Amer. Math. Soc. 78 (1980), 385–390 DOI 10.1090/S0002-9939-1980-0553381-X | MR 0553381 | Zbl 0449.47059
[4] Gaubert S., Gunawardena J.: A Nonlinear Hierarchy for Discrete Event Systems. Technical Report No. HPL-BRIMS-98-20, BRIMS, Hewlett–Packard Laboratories, Bristol 1998
[5] Gunawardena J., Keane M.: On the Existence of Cycle Times for Some Nonexpansive Maps. Technical Report No. HPL-BRIMS-95-003, BRIMS, Hewlett–Packard Laboratories, Bristol 1995
[6] Nussbaum R. D.: Eigenvectors of Nonlinear Positive Operators and the Linear Krein–Rutman Theorem (Lecture Notes in Mathematics 886). Springer Verlag, Berlin 1981, pp. 309–331 MR 0643014
[7] Nussbaum R. D.: Finsler structures for the part-metric and Hilbert’s projective metric, and applications to ordinary differential equations. Differential and Integral Equations 7 (1994), 1649–1707 MR 1269677 | Zbl 0844.58010
[8] Riesz F., Sz.-Nagy B.: Functional Analysis. Frederick Ungar Publishing Company, New York 1955 MR 0071727 | Zbl 0732.47001
[9] Thompson A. C.: On certain contraction mappings in a partially ordered vector space. Proc. Amer. Math. Soc. 14 (1963), 438–443 MR 0149237 | Zbl 0147.34903
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