| Abstract |
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The Galois group of an additive polynomial over a finite field is
contained in a finite general linear group. We will discuss three
different probability distributions on these polynomials, and estimate
the probability that a random additive polynomial has a "large" Galois
group. Our computations use a trick that gives us characteristic
polynomials of elements of the Galois group, so we may use our
knowledge of the maximal subgroups of finite general linear groups.
This is joint work with Lior Bary-Soroker and Alexei Entin.
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