Showing results 1 to 22 of 22
A Helly-type theorem for line transversals to disjoint unit balls Holmsen, Andreas F; Katchalski M; Lewis T, DISCRETE COMPUTATIONAL GEOMETRY, v.29, no.4, pp.595 - 602, 2003-06 |
A stepping-up lemma for topological set systems Goaoc, Xavier; Holmsen, Andreas F; Patáková,Zuzana, 37th International Symposium on Computational Geometry, SoCG 2021, Schloss Dagstuhl- Leibniz-Zentrum fur Informatik GmbH, Dagstuhl Publishing, 2021-06 |
Colorful theorems in Convexity Holmsen, Andreas F, 9th Japan-Korea Workshop on Algebra and Combinatorics, Tohoku University, 2011-01-24 |
Convexity in topological affine planes Dhandapani, R; Goodman, JE; Holmsen, Andreas F; Pollack, R; Smorodinsky, S, DISCRETE COMPUTATIONAL GEOMETRY, v.38, no.2, pp.243 - 257, 2007-09 |
Cremona convexity, frame convexity and a theorem of Santalo Goodman, JE; Holmsen, Andreas F; Pollack, R; Ranestad, K; Sottile, F, ADVANCES IN GEOMETRY, v.6, no.2, pp.301 - 321, 2006 |
Generalized wiring diagrams, realization spaces, and configurations of convex sets Holmsen, Andreas F, 11th Japan-Korea Workshop on Algebra and Combinatorics, Kyushu University, 2013-01-25 |
Geomteric transversal theory: T(3)-families in the plane Holmsen, Andreas F, Algorithmic and Combinatorial Geometry, 2009-06-19 |
Helly-type theorems for line transversals to disjoint unit balls Cheong, Otfried; Goaoc, Xavier; Holmsen, Andreas F; Petitjean, Sylvain, DISCRETE & COMPUTATIONAL GEOMETRY, v.39, pp.194 - 212, 2008-03 |
Intersecting convex sets by rays Fulek, R.; Holmsen, Andreas F; Pach, J., 24th Annual Symposium on Computational Geometry, SCG'08, pp.385 - 391, 2008-06-09 |
Intersecting Convex Sets by Rays Fulek, R; Holmsen, Andreas F; Pach, J, DISCRETE & COMPUTATIONAL GEOMETRY, v.42, no.3, pp.343 - 358, 2009-10 |
New bounds on the Katchalski-Lewis transversal problem Holmsen, Andreas F, DISCRETE COMPUTATIONAL GEOMETRY, v.29, no.3, pp.395 - 408, 2003-04 |
NEW RESULTS FOR T (k)-FAMILIES IN THE PLANE Holmsen, Andreas F, MATHEMATIKA, v.56, no.1, pp.86 - 92, 2010 |
No Helly theorem for stabbing translates by lines in R-3 Holmsen, Andreas F; Matousek, J, DISCRETE COMPUTATIONAL GEOMETRY, v.31, no.3, pp.405 - 410, 2004-04 |
On generalizations of the Erdos-Szekeres problem Holmsen, Andreas F, Recent advances in Transversal and Helly-type theorems in Geometry, Combinatorics and Topology, BIRS, Banff, Alberta, Canada, 2012-10-25 |
Order-types of families of convex bodies Holmsen, Andreas F, 10th Korea-Japan Workshop on Algebra and Combinatorics, Postech, 2012-01-28 |
POINTS SURROUNDING THE ORIGIN Holmsen, Andreas F; Pach, J; Tverberg, H, COMBINATORICA, v.28, no.6, pp.633 - 644, 2008 |
Realization spaces and Erdos-Szekeres theorems for convex sets Holmsen, Andreas F, Combinatorial Geometries: matroids, oriented matroids and applications, CIRM(Centro Internazionale per la Ricerca Matematica), 2013-04-04 |
Recent progress on line transversals to families of translated ovals Holmsen, Andreas F, AMS-IMS-SIAM Joint summer research conference, 2006-06-18 |
Some new results concerning T(k)-families in the plane Holmsen, Andreas F, Trannsversal and Helly-type theorems in Geometry, Combinatorics and Topology, BIRS, Banff, Alberta, Canada, 2009-09-24 |
THE ERDOS-SZEKERES PROBLEM FOR NON-CROSSING CONVEX SETS Dobbins, Michael Gene; Holmsen, Andreas F; Hubard, Alfredo, MATHEMATIKA, v.60, no.2, pp.463 - 484, 2014-07 |
The Katchalski-Lewis transversal problem in R-n Holmsen, Andreas F, DISCRETE COMPUTATIONAL GEOMETRY, v.37, no.3, pp.341 - 349, 2007-03 |
The triples of geometric permutations for families of disjoint translates Asinowski A; Holmsen, Andreas F; Katchalski M, DISCRETE MATHEMATICS, v.241, no.1-3, pp.23 - 32, 2001-10 |
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