Abstract

Let G be a simple graph, let f : V(G)&#8594{1,2,...,|V(G)|} be a bijective mapping. The weight of v &#8712 V(G) is the sum of labels of all vertices adjacent to v . We say that f is a distance magic labeling of G if the weight of every vertex is the same constant k and we say that f is a handicap magic labeling of G if the weight of every vertex v is l + f(v) for some constant l. Graphs that allow such labelings are called distance magic or handicap, respectively. Distance magic and handicap labelings of regular graphs are used for scheduling incomplete tournaments. While distance magic labelings correspond to so called equalized tournaments, handicap labelings can be used to schedule incomplete tournaments that are more challenging to stronger teams or players, hence they increase competition and yield attractive schemes in which every games counts. We summarize known results on distance magic and handicap labelings and construct a new infinite class of 4-regular handicap graphs.

Highlights

  • Distance magic and handicap labelings of regular graphs are used for scheduling incomplete tournaments

  • While distance magic labelings correspond to so called equalized tournaments, handicap labelings can be used to schedule incomplete tournaments that are more challenging to stronger teams or players, they increase competition and yield attractive schemes in which every game counts

  • We summarize known results on distance magic and handicap labelings and construct a new infinite class of 4-regular handicap graphs

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Summary

Motivation

The motivation for handicap graphs comes from scheduling handicap incomplete tournaments which are a natural extension of an earlier problem of scheduling fair incomplete tournaments introduced by Froncek, Kovar, and Kovarova [6]. A complete tournament of n teams is represented by a complete graph in which each team plays against all n − 1 other teams. An equalized incomplete tournament can be represented by a distance magic graph [6]. The vertices of the graph represent teams, while the edges represent matches played in the tournament. In this paper we identify vertices with their labels, by x we understand the vertex labeled x. This means that for every x we have f (x) = x, which simplifies our notation.

Known Results
Handicap Graphs
Handicap Labelings and Related Results
Main Result
Conclusion

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