Publication at Faculty of Mathematics and Physics |
2015
Abstract
We study drawings of graphs on the torus with crossings allowed. A question posed in [M.
DeVos, B. Mohar, and R. Šámal, Unexpected behaviour of crossing sequences, J.
Combin. Theory Ser.
B 101 (2011), no. 6, 448-463], specialized to the case of the torus, asks, whether for every disconnected graph there is a drawing in the torus with the minimal number of crossings, such that one of the graphs is drawn in a planar disc. We reduce the problem to an interesting question from the geometry of numbers and solve a special case.