Separoids, their categories and a Hadwiger-type theorem for transversals
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Publication:1597679
DOI10.1007/s00454-001-0075-2zbMath1002.52008OpenAlexW2090829309MaRDI QIDQ1597679
Jorge Luis Arocha, Javier Bracho, Ricardo Strausz, Luis Montejano, Deborah Oliveros
Publication date: 30 May 2002
Published in: Discrete \& Computational Geometry (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00454-001-0075-2
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How do 9 points look like in \(\mathbb{E}^3\)? ⋮ Flat transversals to flats and convex sets of a fixed dimension ⋮ Erdős-Szekeres ``happy end-type theorems for separoïds ⋮ Hyperseparoids: a representation theorem ⋮ Topological transversals to a family of convex sets ⋮ Configuration spaces of \(n\) lines in affine \((n + k)\)-space ⋮ Counting polytopes via the Radon complex ⋮ Homomorphisms of separoids ⋮ The topology of the space of transversals through the space of configurations
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