Finbow, Stephen2017-04-132017-04-1320032017-04-13http://hdl.handle.net/1828/7913The well studied class of irredundant vertex sets of a graph has been previously shown to be a special case of (a) a “Private Neighbor Cube” of eight classes of vertex subsets and (b) a family of sixty four classes of “generalised irredundant sets.” The thesis makes various advances in the theory of irredundance. More specifically: (i) Nordhaus-Gaddum results for all the sixty-four classes of generalised irredundant sets are obtained. (ii) Sharp lower bounds involving order and maximum degree are attained for two specific classes in the Private Neighbor Cube. (iii) A new framework which includes both of the above generalisations and various concepts of domination, is proposed.enAvailable to the World Wide WebGraph theoryDomination (Graph theory)Thesis