AbstractHilbert'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
By studying general geometric properties of cone spaces, we prove the existence of a distance on the...
AbstractWe investigate the Lipschitz continuity of the best approximation operator from a Hilbert (B...
AbstractLet D be a bounded strictly convex domain in Euclidean n-space equipped with its Hilbert met...
AbstractHilbert's metric on a cone K is a measure of distance between the rays of K. Hilbert's metri...
: A smooth bounded convex domain equipped with its Hilbert metric provides a nice example of Finsler...
The Hilbert metric is a widely used tool for analysing the convergence of Markov processes and the e...
15 pages, 0 figures.There are two natural metrics defined on an arbitrary convex cone: Thompson\'s p...
William Henry Ruckle introduced the notion of arithmetic convergence in the sense that a sequence d...
The Hilbert metric on convex subsets of $\mathbb R^n$ has proven a rich notion and has been extensiv...
AbstractDavid Hilbert discovered in 1895 an important metric that is canonically associated to an ar...
AbstractSmooth bounded convex domains equipped with their Hilbert metric provide nice examples of co...
We associate certain probability measures on R to geodesics in the space HL of positively curved met...
In this paper we introduce a general notion of a symmetric cone, valid for the finite and infinite d...
International audienceHilbert's fourth problem asks for the construction and the study of metrics on...
AbstractIn this work, Cantor’s intersection theorem is extended to cone metric spaces and as an appl...
By studying general geometric properties of cone spaces, we prove the existence of a distance on the...
AbstractWe investigate the Lipschitz continuity of the best approximation operator from a Hilbert (B...
AbstractLet D be a bounded strictly convex domain in Euclidean n-space equipped with its Hilbert met...
AbstractHilbert's metric on a cone K is a measure of distance between the rays of K. Hilbert's metri...
: A smooth bounded convex domain equipped with its Hilbert metric provides a nice example of Finsler...
The Hilbert metric is a widely used tool for analysing the convergence of Markov processes and the e...
15 pages, 0 figures.There are two natural metrics defined on an arbitrary convex cone: Thompson\'s p...
William Henry Ruckle introduced the notion of arithmetic convergence in the sense that a sequence d...
The Hilbert metric on convex subsets of $\mathbb R^n$ has proven a rich notion and has been extensiv...
AbstractDavid Hilbert discovered in 1895 an important metric that is canonically associated to an ar...
AbstractSmooth bounded convex domains equipped with their Hilbert metric provide nice examples of co...
We associate certain probability measures on R to geodesics in the space HL of positively curved met...
In this paper we introduce a general notion of a symmetric cone, valid for the finite and infinite d...
International audienceHilbert's fourth problem asks for the construction and the study of metrics on...
AbstractIn this work, Cantor’s intersection theorem is extended to cone metric spaces and as an appl...
By studying general geometric properties of cone spaces, we prove the existence of a distance on the...
AbstractWe investigate the Lipschitz continuity of the best approximation operator from a Hilbert (B...
AbstractLet D be a bounded strictly convex domain in Euclidean n-space equipped with its Hilbert met...
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