On the cut-set of the Gruenberg-Kegel graph of a finite solvable group

Abstract

Let (G) be the Gruenberg-Kegel graph of a finite group G. We prove that if G is solvable and σ is a cut-set for (G), then G has a σ-series of length 5 whose factors are controlled. As a consequence, we prove that if G is a solvable group and (G) has a cut-vertex p, then the Fitting length F(G) of G is bounded and the bound obtained is the best possible. A cut-set is said minimal if it does not contain any other proper subset that is a cut-set for the graph. For a finite solvable group G, we give a geometrical description of (G) when it has a minimal cut-set of size 2, for a finite solvable group G.

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