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Results 1 to 5 from 5 found in "Open Problems":
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| The Open Problems Project | | to record open problems of interest to researchers in computational geometry and related publication of thirty problems in Computational Geometry Column 42 [MO01] (see Problems | | maven.smith.edu | | Open Combinatorial Geometry Problems | | Combinatorial Geometry Open Problems. Index of Problems. Crossing Families. RESEARCHER: Pavel Valtr. OFFICE: CoRE 411. Email:valtr@dimacs.rutgers.edu. DESCRIPTION: Consider N points in the plane so th | | dimacs.rutgers.edu | | The Geometry Junkyard: Open Problems | | Open Problems. Antipodes. Jim Propp asks whether the two farthest apart points, as measured by surface distance, on a symmetric convex body must be opposite each other on the body. Apparently this is | | www.ics.uci.edu | | Open problems in Algebraic Geometry | | Open problems in Algebraic Geometry Open problems in Algebraic Geometry Torelli locus. See also [Oo], section 7, where it is asked whether there exists an S as above which is fully contained in the (c | | citeseer.ist.psu.edu | | Open problems in algebraic geometry | | Open problems in algebraic geometry Open problems in algebraic geometry The open problems presented here were collected on the occasion of a workshop on Arithmetic Geometry at the University ofUtrecht | | igitur-archive.library.uu.nl |
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