From the Cherlin-Zilber Conjecture via sharply 2-transitive groups to the Burnside problem
Abstract
We review the current state of the Cherlin-Zilber Algebraicity Conjecture on simple groups of finite Morley rank, which states that every such group is the group of K-rational points of an algebraic group for some algebraically closed field K. We will explain the relevance of sharply 2-transitive groups as a potential source of counterexamples and how the Burnside problem necessarily comes into the picture.
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