A CFSG-free explicit Jordan's theorem over arbitrary fields
Abstract
We prove a version of Jordan's classification theorem for finite subgroups of GLn(K) that is at the same time quantitatively explicit, CFSG-free, and valid for arbitrary K. This is the first proof to satisfy all three properties at once. Our overall strategy follows Larsen and Pink [24], with explicit computations based on techniques developed by the authors and Helfgott [2, 3], particularly in relation to dimensional estimates.
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