Large orbits of nilpotent subgroups of linear groups
Abstract
Suppose that G is a finite solvable group and V is a finite, faithful and completely reducible G-module. Let N be a nilpotent subgroup of G, then there exits v ∈ V such that |N(v)| ≤ (|N|/p)1/p, where p is the smallest prime divisor of |N|.
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