Zariski Density and Computing in Arithmetic Groups
Abstract
For n > 2, let denote either SL(n, Z) or Sp(n, Z). We give a practical algorithm to compute the level of the maximal principal congruence subgroup in an arithmetic group H≤ . This forms the main component of our methods for computing with such arithmetic groups H. More generally, we provide algorithms for computing with Zariski dense groups in . We use our GAP implementation of the algorithms to solve problems that have emerged recently for important classes of linear groups.
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