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Counting cusps of subgroups of $ mathrm{PSL}_2(mathcal{O}_K)$
Authors:Kathleen L. Petersen
Affiliation:Department of Mathematics and Statistics, Queen's University, Kingston, Ontario K7L 3N6, Canada
Abstract:Let $ K$ be a number field with $ r$ real places and $ s$ complex places, and let $ mathcal{O}_K$ be the ring of integers of $ K$. The quotient $ [mathbb{H}^2]^rtimes [mathbb{H}^3]^s/mathrm{PSL}_2(mathcal{O}_K)$ has $ h_K$ cusps, where $ h_K$ is the class number of $ K$. We show that under the assumption of the generalized Riemann hypothesis that if $ K$ is not $ mathbb{Q}$ or an imaginary quadratic field and if $ i not in K$, then $ mathrm{PSL}_2(mathcal{O}_K)$ has infinitely many maximal subgroups with $ h_K $ cusps. A key element in the proof is a connection to Artin's Primitive Root Conjecture.

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