Convergence in Hilbert's metric and convergence in direction

Elon Kohlberg; Abraham Neyman

doi:10.1016/0022-247X(83)90220-2

Convergence in Hilbert's metric and convergence in direction

Elon Kohlberg^*, Abraham Neyman

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

3 Scopus citations

Abstract

Hilbert's metric on a cone K is a measure of distance between the rays of K. Hilbert's metric has many applications, but they all depend on the equivalence between closeness of two rays in the Hilbert metric and closeness of the two unit vectors along these rays (in the usual sense). A necessary and sufficient condition on K for this equivalence to hold is given.

Original language	English
Pages (from-to)	104-108
Number of pages	5
Journal	Journal of Mathematical Analysis and Applications
Volume	93
Issue number	1
DOIs	https://doi.org/10.1016/0022-247X(83)90220-2
State	Published - 30 Apr 1983
Externally published	Yes

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10.1016/0022-247X(83)90220-2

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title = "Convergence in Hilbert's metric and convergence in direction",

abstract = "Hilbert's metric on a cone K is a measure of distance between the rays of K. Hilbert's metric has many applications, but they all depend on the equivalence between closeness of two rays in the Hilbert metric and closeness of the two unit vectors along these rays (in the usual sense). A necessary and sufficient condition on K for this equivalence to hold is given.",

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AB - Hilbert's metric on a cone K is a measure of distance between the rays of K. Hilbert's metric has many applications, but they all depend on the equivalence between closeness of two rays in the Hilbert metric and closeness of the two unit vectors along these rays (in the usual sense). A necessary and sufficient condition on K for this equivalence to hold is given.

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Convergence in Hilbert's metric and convergence in direction

Abstract

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