• 闵可夫斯基定理，有时也被称为闵可夫斯基第一定理：

假设Γ是在n维欧氏空间Rⁿ的格和K是中心对称凸体，${\displaystyle vol(K)>2^{n}vol(R^{n}/\Gamma )}$  ，则K包含Γ非零的向量。

• 闵可夫斯基第二定理，是他的第一定理加强。定义K数字λ最大下界，为 λ_k，称为连续最低。

则λK在Γ中ķ线性无关，则有：

${\displaystyle \lambda _{1}\lambda _{2}\cdots \lambda _{n}vol(K)\leq 2^{n}vol(R^{n}/\Gamma ).}$ 

在1930年至1960年的很多数论学家取得了很多成果（包括路易·莫德尔，哈罗德·达文波特和卡尔·路德维希·西格尔）。近年来，Lenstra，奥比昂，巴尔维诺克对组合理论的扩展对一些凸体的格数量进行了列举。

• 施密特子空间定理
• 在几何数论的子空间定理，由沃尔夫冈·施密特在1972年证明
• 设n是正整数，如果n个n维线性型L₁,...,L_n都具有代数系数，並且是线性无关的，那么对于任何给定的实数ε> 0，所有满足条件: ${\displaystyle |L_{1}(x)\cdots L_{n}(x)|<|x|^{-\epsilon }}$  的n维非零整数点x都在有限多个Qⁿ的真子空间内。

始于闵可夫斯基的几何数论在泛函分析上产生深远的影响。闵可夫斯基证明，对称凸体诱导有限维向量空间的范数。闵可夫斯基定理由柯尔莫哥洛夫推广到拓扑向量空间。柯尔莫哥洛夫的定理证明有界闭对称凸集生成Banach空间的拓扑。当前Kalton et alia. Gardner对星形集和非凸集取得了一些成果。

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