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Note on k-planar crossing numbers

Combinatorics 2018-12-27 v1

Abstract

The crossing number cr(G)cr(G) of a graph G=(V,E)G=(V,E) is the smallest number of edge crossings over all drawings of GG in the plane. For any k1k\ge 1, the kk-planar crossing number of GG, crk(G)cr_k(G), is defined as the minimum of cr(G0)+cr(G1)++cr(Gk1)cr(G_0)+cr(G_1)+\ldots+cr(G_{k-1}) over all graphs G0,G1,,Gk1G_0, G_1,\ldots, G_{k-1} with i=0k1Gi=G\cup_{i=0}^{k-1}G_i=G. It is shown that for every k1k\ge 1, we have crk(G)(2k21k3)cr(G)cr_k(G)\le \left(\frac{2}{k^2}-\frac1{k^3}\right)cr(G). This bound does not remain true if we replace the constant 2k21k3\frac{2}{k^2}-\frac1{k^3} by any number smaller than 1k2\frac1{k^2}. Some of the results extend to the rectilinear variants of the kk-planar crossing number.

Keywords

Cite

@article{arxiv.1611.05746,
  title  = {Note on k-planar crossing numbers},
  author = {János Pach and László A. Székely and Csaba D. Tóth and Géza Tóth},
  journal= {arXiv preprint arXiv:1611.05746},
  year   = {2018}
}
R2 v1 2026-06-22T16:55:54.843Z