Prime divisors and the number of conjugacy classes of finite groups
Abstract
We prove that there exists a universal constant D such that if p is a prime divisor of the index of the Fitting subgroup of a finite group G, then the number of conjugacy classes of G is at least Dp/log2 p. We conjecture that we can take D=1 and prove that for solvable groups, we can take D=1/3.
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