The Number of Solvabilizers in Finite Groups

Abstract

Considering a finite group G, for any element x∈ G, the solvabilizer of x in G is defined as SolG(x)=\y ∈ G : x, y is solvable\. In this paper, we introduce Solv(G) as the number of distinct solvabilizers of elements in G. A group is called n-solvabilizer if |Solv(G)|=n. We compute |Solv(G)| for various classes of non-abelian simple groups, including PSL(2, 2n); PSL(2, 3n) with an odd integer n; and PSL(2, p) with a prime p>7. Furthermore, we show that for any nonsolvable group G, |Solv(G)|≥ 32. Finally, we implement an algorithm in GAP for calculating |Solv(G)| for any nonsolvable group G. This algorithm can be adapted for all questions generalizing to nilpotent and other subgroup-closed classes of finite groups.

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