Radoslav Fulek, Jan Kynčl, Dömötör Pálvölgyi
Published 2016-12-02Version 1
We introduce a common generalization of the strong Hanani-Tutte theorem and the weak Hanani-Tutte theorem: if a graph $G$ has a drawing $D$ in the plane where every pair of independent edges crosses an even number of times, then $G$ has a planar drawing preserving the rotation of each vertex that was incident only to even edges in $D$. The theorem is implicit in the proof of the strong Hanani-Tutte theorem by Pelsmajer, Schaefer and \v{S}tefankovi\v{c}. We give a new, somewhat simpler proof.
Comments: 5 pages, 1 figure
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