The crossing number of a projective graph is quadratic in the face--width

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Authors	HLINĚNÝ Petr SALAZAR Gelasio GITLER Isidoro LEANOS Jesus
Year of publication	2008
Type	Article in Periodical
Magazine / Source	Electronic Journal of Combinatorics
MU Faculty or unit	Faculty of Informatics
Citation
Web	online paper
Field	General mathematics
Keywords	crossing number; projective plane; face-width
Description	We show that for each integer g there is a constant Cg such that every graph that embeds in the projective plane with sufficiently large face-width r has crossing number at least Cgr^2 in the orientable surface Sg of genus g. As a corollary, we give a polynomial time constant factor approximation algorithm for the crossing number of projective graphs with bounded degree.
Related projects:	Highly Parallel and Distributed Computing Systems Utilization of Structural and Width Parametres in Combinatorics and Algorithmic Complexity