On finite simple images of triangle groups
For a simple algebraic group G in characteristic p, a triple (a,b,c) of positive integers is said to be rigid for G if the dimensions of the subvarieties of G of elements of order dividing a,b,c sum to 2dim G. In this paper we complete the proof of a conjecture of the third author, that for a rigid...
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| Zusammenfassung: | For a simple algebraic group G in characteristic p, a triple (a,b,c) of
positive integers is said to be rigid for G if the dimensions of the
subvarieties of G of elements of order dividing a,b,c sum to 2dim G. In this
paper we complete the proof of a conjecture of the third author, that for a
rigid triple (a,b,c) for G with p>0, the triangle group T_{a,b,c} has only
finitely many simple images of the form G(p^r). We also obtain further results
on the more general form of the conjecture, where the images G(p^r) can be
arbitrary quasisimple groups of type G. |
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| DOI: | 10.48550/arxiv.1706.07641 |