Abstract.
It is a difficult problem in general to decide whether a Cayley graph Cay(G; S) is connected where G is an arbitrary finite group and S a subset of G. For example, testing primitivity of an element in a finite field is a special case of this problem but notoriously hard. In this paper, it is shown that if a Cayley graph Cay(G; S) is known to be connected then its fault tolerance can be determined in polynomial time in |S|log(|G|). This is accomplished by establishing a new structural result for Cayley graphs. This result also yields a simple proof of optimal fault tolerance for an infinite class of Cayley graphs, namely exchange graphs. We also use the proof technique for our structural result to give a new proof of a known result on quasiminimal graphs.
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Received March 10, 2006
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Gao, S., Novick, B. Fault Tolerance of Cayley Graphs. Ann. Comb. 11, 161–171 (2007). https://doi.org/10.1007/s00026-007-0312-3
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DOI: https://doi.org/10.1007/s00026-007-0312-3