arithmetic fuchsian group造句

and a similar bound holds for more general arithmetic Fuchsian groups.
A similar bound holds for more general arithmetic Fuchsian groups.
A natural question is to identify those among arithmetic Fuchsian groups which are not strictly contained in a larger discrete subgroup.
Any order in a quaternion algebra over \ mathbb Q which is not split over \ mathbb Q but splits over \ mathbb R yields a cocompact arithmetic Fuchsian group.
An arithmetic Fuchsian group is constructed from the following data : a totally real number field F, a quaternion algebra A over F and an order \ mathcal O in A.
It's difficult to find arithmetic fuchsian group in a sentence. 用arithmetic fuchsian group造句挺难的

Arithmetic Fuchsian groups can be constructed directly in the latter group by taking the integral points in the orthogonal group associated to quadratic forms defined over number fields ( and satisfying certain conditions ).
If \ Gamma is an arithmetic Fuchsian group then k \ Gamma and A \ Gamma together are a number field and quaternion algebra from which a group commensurable to \ Gamma may be derived.
The simplest example of an arithmetic Fuchsian group is the modular \ mathrm { PSL } _ 2 ( \ mathbb Z ), which is obtained by the construction above with A = M _ 2 ( \ mathbb Q ) and \ mathcal O = M _ 2 ( \ mathbb Z ).