Fields of definition for triangle groups as Fuchsian groups

Abstract

The compact hyperbolic triangle group (p,q,r) admits a canonical representation to PSL2(R) with discrete image which is unique up to conjugation. The trace field of this representation is \[K = Q((π/p), (π/q), (π/r)).\] We prove that there are exactly eleven such groups which are conjugate to subgroups of PSL2(K). Moreover, we prove that there are no additional compact hyperbolic triangle groups which are conjugate to subgroups of PSL2(L) for any totally real field L. This answers a question first raised by Waterman and Machlachlan, and also resolves (in the positive) five (interrelated) recent conjectures of McMullen.