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On the rectilinear crossing number of complete uniform hypergraphs. / Anshu, Anurag; Gangopadhyay, Rahul; Shannigrahi, Saswata; Vusirikala, Satyanarayana.
в: Computational Geometry: Theory and Applications, Том 61, 01.02.2017, стр. 38-47.Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование
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TY - JOUR
T1 - On the rectilinear crossing number of complete uniform hypergraphs
AU - Anshu, Anurag
AU - Gangopadhyay, Rahul
AU - Shannigrahi, Saswata
AU - Vusirikala, Satyanarayana
PY - 2017/2/1
Y1 - 2017/2/1
N2 - In this paper, we consider a generalized version of the rectilinear crossing number problem of drawing complete graphs on a plane. The minimum number of crossing pairs of hyperedges among all d-dimensional rectilinear drawings of a d-uniform hypergraph is known as the d-dimensional rectilinear crossing number of the hypergraph. The currently best-known lower bound on the d-dimensional rectilinear crossing number of a complete d-uniform hypergraph with n vertices in general position in Rd is Ω(2ddlogd)(n2d). In this paper, we improve this lower bound to Ω(2d)(n2d). We also consider the special case when all the vertices of a d-uniform hypergraph are placed on the d-dimensional moment curve. For such d-dimensional rectilinear drawings of the complete d-uniform hypergraph with n vertices, we show that the number of crossing pairs of hyperedges is Θ(4dd)(n2d).
AB - In this paper, we consider a generalized version of the rectilinear crossing number problem of drawing complete graphs on a plane. The minimum number of crossing pairs of hyperedges among all d-dimensional rectilinear drawings of a d-uniform hypergraph is known as the d-dimensional rectilinear crossing number of the hypergraph. The currently best-known lower bound on the d-dimensional rectilinear crossing number of a complete d-uniform hypergraph with n vertices in general position in Rd is Ω(2ddlogd)(n2d). In this paper, we improve this lower bound to Ω(2d)(n2d). We also consider the special case when all the vertices of a d-uniform hypergraph are placed on the d-dimensional moment curve. For such d-dimensional rectilinear drawings of the complete d-uniform hypergraph with n vertices, we show that the number of crossing pairs of hyperedges is Θ(4dd)(n2d).
KW - Crossing simplices
KW - Gale Transform
KW - Ham–Sandwich Theorem
KW - Moment curve
UR - http://www.scopus.com/inward/record.url?scp=84998827999&partnerID=8YFLogxK
U2 - 10.1016/j.comgeo.2016.11.001
DO - 10.1016/j.comgeo.2016.11.001
M3 - Article
AN - SCOPUS:84998827999
VL - 61
SP - 38
EP - 47
JO - Computational Geometry: Theory and Applications
JF - Computational Geometry: Theory and Applications
SN - 0925-7721
ER -
ID: 49848890