The horoboundary and isometry group of Thurston's Lipschitz metric.
Cormac Walsh
Preprint.
arXiv
Isometries of polyhedral Hilbert geometries.
Bas Lemmens, Cormac Walsh
Journal of Topology and Analysis. 3 (2) 213-241, 2011.
arXiv
The action of a nilpotent group on its horofunction boundary has finite orbits.
Cormac Walsh
Groups, Geometry, and Dynamics. 5 (1) 189-206, 2011.
arXiv
Busemann points of Artin groups of dihedral type.
Cormac Walsh
Internat. J. Algebra Comput. 19 (7) 891-910, 2009.
arXiv
The horofunction boundary of the Hilbert geometry.
Cormac Walsh
Advances in Geometry 8 (4) 503-529, 2008.
arXiv
The horofunction boundary of finite-dimensional normed spaces.
Cormac Walsh
Mathematical Proceedings of the Cambridge Philosophical Society, Volume
142, Issue 03, May 2007, pp 497-507
arXiv
Minimum representing measures in Idempotent Analysis.
Cormac Walsh
Appears in "Idempotent Mathematics and Mathematical Physics",
G. L. Litvinov and S. N. Sergeev, Eds, vol. 495 of Contemporary Mathematics,
pp. 367-382, AMS, 2009.
arXiv
A Metric Inequality for the Thompson and Hilbert Geometries.
R. D. Nussbaum and Cormac Walsh
J. Inequalities Pure Appl. Math. 5 (3) Article 54, 2004.
Iterates of Maps which are Non-expansive in Hilbert's Projective Metric.
J. Gunawardena and Cormac Walsh
Kybernetika 39 (2) 193-204, 2003.