Abstract
Given a finite group G, two elements are ≡ m -related if they lie in exactly the same maximal subgroups of G. This equivalence relation was introduced by P. J. Cameron, A. Lucchini and C. M. Roney-Dougal to understand better the generated set for finite groups. We study the relation ≡ m in a conjugacy class of G and determine sufficient conditions to ensure that such conjugacy class is contained in the Fitting subgroup F(G) of G. If G is soluble and x, y are two ≡ m -related elements of G such that (|xG |, |yG |) = 1, we prove that they lie in F(G).
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