Characterization of (2,q) by the number of singular elements
Abstract
Given a finite group G, let π(G) denote the set of all primes that divide the order of G. For a prime r ∈ π(G), we define r-singular elements as those elements of G whose order is divisible by r. Denote by Sr(G) the number of r-singluar elements of G. We denote the proportion Sr(G)/|G| of r-singular elements in G by μr(G). Let μ(G) := \μr(G) | r∈ π(G)\ be the set of all proportions of r-singular elements for each prime r in π(G). In this paper, we prove that if a finite group G has the same set μ(G) as the simple group (2,q), then G is isomorphic to (2,q).
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