Local systems and Suzuki groups
Abstract
We study geometric monodromy groups G,q of the local systems q on the affine line over 2 of rank D=q(q-1), q=22n+1, constructed in Ka-ERS. The main result of the paper shows that G,q is either the Suzuki simple group 2 B2(q), or the special linear group D. We also show that 8 has geometric monodromy group 2B2(8), and arithmetic monodromy group (2 B2(8)) over 2, thus establishing [Conjecture 2.2]Ka-ERS in full in the case q=8.
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