Assume that G is a finite group and let a and b be non-negative integers. We define an undirected graph Γa,b(G) whose vertices correspond to the elements of Ga∪Gb and in which two tuples (x1,…,xa) and (y1,…,yb) are adjacent if and only if 〈x1,…,xa,y1,…,yb〉=G. Our aim is to estimate the genus, the thickness and the crossing number of the graph Γa,b(G) when a and b are positive integers, giving explicit lower bounds on these invariants in terms of |G|.
Genus, thickness and crossing number of graphs encoding the generating properties of finite groups / Acciarri, C.; Lucchini, A.. - In: DISCRETE MATHEMATICS. - ISSN 0012-365X. - 344:4(2021), pp. 1-7. [10.1016/j.disc.2021.112289]
Genus, thickness and crossing number of graphs encoding the generating properties of finite groups
Acciarri C.;
2021
Abstract
Assume that G is a finite group and let a and b be non-negative integers. We define an undirected graph Γa,b(G) whose vertices correspond to the elements of Ga∪Gb and in which two tuples (x1,…,xa) and (y1,…,yb) are adjacent if and only if 〈x1,…,xa,y1,…,yb〉=G. Our aim is to estimate the genus, the thickness and the crossing number of the graph Γa,b(G) when a and b are positive integers, giving explicit lower bounds on these invariants in terms of |G|.
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