Irreducible restrictions of Brauer characters of the Chevalley group G2(q) to its proper subgroups
Abstract
Let G2(q) be the Chevalley group of type G2 defined over a finite field with q=pn elements, where p is a prime number and n is a positive integer. In this paper, we determine when the restriction of an absolutely irreducible representation of G in characteristic other than p to a maximal subgroup of G2(q) is still irreducible. Similar results are obtained for 2B2(q) and 2G2(q).
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