| Information | |
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| has gloss | eng: In mathematics, a Shimura variety is an analogue of a modular curve, and is (roughly) a quotient of an Hermitian symmetric space by a congruence subgroup of an algebraic group. The simplest example is the quotient of the upper half-plane by SL2(Z). The term Shimura variety applies to the higher-dimensional case, in the case of one-dimensional varieties one speaks of Shimura curves. |
| lexicalization | eng: Shimura variety |
| instance of | e/Automorphic form |
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| Japanese | |
| lexicalization | jpn: 志村多様体 |
| Chinese | |
| has gloss | zho: 在數學中的代數幾何與數論領域,志村簇是一類特殊的代數簇,可視之為模曲線在高維度的類推。粗略地說,志村簇乃是埃爾米特對稱空間對某個代數群之同餘子群的商;最簡單的例子是上半平面對 \mathrmSL}_2(\Z) 的商。一維的志村簇有時也被稱為志村曲線。 |
| lexicalization | zho: 志村簇 |
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