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New non-arithmetic complex hyperbolic lattices II

We describe a general procedure to produce fundamental domains for complex hyperbolic triangle groups, a class of groups that contains a representative of the commensurability class of every known non-arithmetic lattice in ${\rm PU}(2,1)$. We discuss several commensurability invariants for lattices, and show that some triangle groups yield new commensurability classes, bringing the number of known non-arithmetic commensurability classes to 22.

preprint2020arXivOpen access

Martin Deraux John R. Parker Julien Paupert

math.GT math.AG

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Martin Deraux John R. Parker Julien Paupert

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