Generalized Connectivity of the Mycielskian Graph under g -Extra Restriction

The g -extra connectivity is a very important index to evaluate the fault tolerance, reliability of interconnection networks. Let g be a non-negative integer, G be a connected graph with vertex set V and edge set E , a subset S ⊆ V is called a g -extra cut of G if the graph induced by the set G − S is disconnected and each component of G − S has at least g + 1 vertices. The g-extra connectivity of G , denoted as κ g ( G ) , is the cardinality of the minimum g -extra cut of G . Mycielski introduced a graph transformation to discover chromatic numbers of triangle-free graphs that can be arbitrarily large. This transformation converts a graph G into a new compound graph called μ ( G ) , also known as the Mycielskian graph of G . In this paper, we study the relationship on g -extra connectivity between the Mycielskian graph μ ( G ) and the graph G . In addition, we show that κ 3 ( μ ( G ) ) = 2 κ 1 ( G ) + 1 for κ 1 ( G ) ≤ m i n { 4 , ⌊ n 2 ⌋ } , and prove the bounds of κ 2 g + 1 ( μ ( G ) ) for g ≥ 2 .