Note on k-planar crossing numbers
Abstract
The crossing number cr(G) of a graph G=(V,E) is the smallest number of edge crossings over all drawings of G in the plane. For any k 1, the k-planar crossing number of G, crk(G), is defined as the minimum of cr(G0)+cr(G1)+…+cr(Gk-1) over all graphs G0, G1,…, Gk-1 with i=0k-1Gi=G. It is shown that for every k 1, we have crk(G) (2k2-1k3)cr(G). This bound does not remain true if we replace the constant 2k2-1k3 by any number smaller than 1k2. Some of the results extend to the rectilinear variants of the k-planar crossing number.
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