NON-NORMAL PAIRS OF NON-EUCLIDEAN CRYSTALLOGRAPHIC GROUPS

JOSÉ LUIS ESTÉVEZ; MILAGROS IZQUIERDO

doi:10.1112/S0024609305017984

Abstract

Let $\Gamma$ be a non-Euclidean crystallographic group. $\Gamma$ is said to be non-maximal if there exists a non-Euclidean crystallographic group $\Gamma'$ such that $\Gamma \le \Gamma'$ and the dimension of the Teichmüller space of $\Gamma$ equals the dimension of the Teichmüller space of $\Gamma'$. The full list of such pairs of groups is computed in the case when $\Gamma$ is non-normal in $\Gamma'$. The corresponding problem for Fuchsian groups was solved by Singerman.

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NON-NORMAL PAIRS OF NON-EUCLIDEAN CRYSTALLOGRAPHIC GROUPS

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NON-NORMAL PAIRS OF NON-EUCLIDEAN CRYSTALLOGRAPHIC GROUPS

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