Alliance free and alliance cover sets
Abstract
A defensive (offensive) k-alliance in =(V,E) is a set S⊂eq V such that every v in S (in the boundary of S) has at least k more neighbors in S than it has in V S. A set X⊂eq V is defensive (offensive) k-alliance free, if for all defensive (offensive) k-alliance S, S X≠, i.e., X does not contain any defensive (offensive) k-alliance as a subset. A set Y ⊂eq V is a defensive (offensive) k-alliance cover, if for all defensive (offensive) k-alliance S, S Y≠, i.e., Y contains at least one vertex from each defensive (offensive) k-alliance of . In this paper we show several mathematical properties of defensive (offensive) k-alliance free sets and defensive (offensive) k-alliance cover sets, including tight bounds on the cardinality of defensive (offensive) k-alliance free (cover) sets.
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