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Order types and cross-sections of line arrangements in R^3

Autor/a

Aichholzer, Oswin

Fabila-Monroy, Ruy

Hurtado Díaz, Fernando Alfredo

Pérez Lantero, Pablo

Ruiz Vargas, Andrés

Urrutia Galicia, Jorge

Vogtenhuber, Birgit

Otros/as autores/as

Universitat Politècnica de Catalunya. DCCG - Grup de recerca en geometria computacional, combinatoria i discreta

Fecha de publicación

2014

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Resumen

We consider sets L = {l1,...., ln} of n labeled lines in general position in R3, and study the order types of point sets fp1; : : : ; png that stem from the intersections of the lines in L with (directed) planes II, not parallel to any line of L, i.e., the proper cross-sections of L. As a main result we show that the number of different order types that can be obtained as cross-sections of L is O(n9), and that this bound is tight.

Peer Reviewed

Postprint (published version)

Tipo de documento

Conference report

Lengua

Inglés

Materias y palabras clave

Àrees temàtiques de la UPC::Matemàtiques i estadística::Geometria::Geometria computacional; Computational geometry; Geometria computacional

Documentos relacionados

https://projects.cs.dal.ca/cccg2014/proceedings/papers/paper39.pdf

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E-prints [73034]