Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q7255664> ?p ?o }
Showing triples 1 to 46 of
46
with 100 triples per page.
- Q7255664 subject Q6309001.
- Q7255664 subject Q6770414.
- Q7255664 subject Q8612087.
- Q7255664 subject Q8872361.
- Q7255664 abstract "In Euclidean plane geometry, a pseudotriangle (pseudo-triangle) is the simply connected subset of the plane that lies between any three mutually tangent convex sets. A pseudotriangulation (pseudo-triangulations) is a partition of a region of the plane into pseudotriangles, and a pointed pseudotriangulation is a pseudotriangulation in which at each vertex the incident edges span an angle of less than π.Although the words "pseudotriangle" and "pseudotriangulation" have been used with various meanings in mathematics for much longer, the terms as used here were introduced in 1993 by Pocchiola and Vegter in connection with the computation of visibility relations and bitangents among convex obstacles in the plane. Pointed pseudotriangulations were first considered by Streinu (2000, 2005) as part of her solution to the carpenter's ruler problem, a proof that any simple polygonal path in the plane can be straightened out by a sequence of continuous motions. Pseudotriangulations have also been used for collision detection among moving objects and for dynamic graph drawing and shape morphing. Pointed pseudotriangulations arise in rigidity theory as examples of minimally rigid planar graphs, and in methods for placing guards in connection with the art gallery theorem. The shelling antimatroid of a planar point set gives rise to pointed pseudotriangulations, although not all pointed pseudotriangulations can arise in this way.For a detailed survey of much of the material discussed here, see Rote et al. (2006).".
- Q7255664 thumbnail Pseudotriangles.svg?width=300.
- Q7255664 wikiPageExternalLink ptriang.
- Q7255664 wikiPageExternalLink motion.ps.
- Q7255664 wikiPageExternalLink citation.cfm?id=160985.161159.
- Q7255664 wikiPageExternalLink 03.ps.
- Q7255664 wikiPageExternalLink pv-ptta-96.ps.gz.
- Q7255664 wikiPageExternalLink pv-vc-93.ps.
- Q7255664 wikiPageExternalLink On_constrained_minimum_pseudotriangulations.pdf.
- Q7255664 wikiPageExternalLink FSTTCS04.pdf.
- Q7255664 wikiPageWikiLink Q11203.
- Q7255664 wikiPageWikiLink Q1138624.
- Q7255664 wikiPageWikiLink Q1191750.
- Q7255664 wikiPageWikiLink Q15192296.
- Q7255664 wikiPageWikiLink Q162886.
- Q7255664 wikiPageWikiLink Q193657.
- Q7255664 wikiPageWikiLink Q19821.
- Q7255664 wikiPageWikiLink Q2000090.
- Q7255664 wikiPageWikiLink Q2348724.
- Q7255664 wikiPageWikiLink Q2635635.
- Q7255664 wikiPageWikiLink Q270513.
- Q7255664 wikiPageWikiLink Q36810.
- Q7255664 wikiPageWikiLink Q37555.
- Q7255664 wikiPageWikiLink Q4253458.
- Q7255664 wikiPageWikiLink Q4774922.
- Q7255664 wikiPageWikiLink Q4918749.
- Q7255664 wikiPageWikiLink Q5045673.
- Q7255664 wikiPageWikiLink Q5282042.
- Q7255664 wikiPageWikiLink Q6051350.
- Q7255664 wikiPageWikiLink Q6053791.
- Q7255664 wikiPageWikiLink Q6309001.
- Q7255664 wikiPageWikiLink Q633674.
- Q7255664 wikiPageWikiLink Q6770414.
- Q7255664 wikiPageWikiLink Q7390263.
- Q7255664 wikiPageWikiLink Q7625050.
- Q7255664 wikiPageWikiLink Q7661882.
- Q7255664 wikiPageWikiLink Q852973.
- Q7255664 wikiPageWikiLink Q8612087.
- Q7255664 wikiPageWikiLink Q8872361.
- Q7255664 comment "In Euclidean plane geometry, a pseudotriangle (pseudo-triangle) is the simply connected subset of the plane that lies between any three mutually tangent convex sets.".
- Q7255664 label "Pseudotriangle".
- Q7255664 depiction Pseudotriangles.svg.