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克鲁尔维数

在交换代数中，一个环的克鲁尔维数定义为素理想链的最大长度。此概念依数学家 Wolfgang Krull（1899年-1971年）命名。

定义

设交换环 $R$ 中有 $n+1$ 个素理想 ${\displaystyle P_{0},\ldots ,P_{n))$ ，使得

{\displaystyle P_{0}\subsetneq P_{1}\subsetneq \ldots \subsetneq P_{n))

则称之为长度为 $n$ 的素理想链，一个无法插入新的素理想的链被称作极大的。 $R$ 的克鲁尔维数定义为素理想链的最大可能长度，这也等于是 $R$ 中素理想的最大可能高度。

根据定义， $R$ 的维数与对素理想的局部化有下述关系

{\displaystyle \dim R=\sup\{\dim R_{\mathfrak {p)):{\mathfrak {p))\in \mathrm {Spec} R\))

其中 $\mathrm {Spec} R$ 表 $R$ 的所有素理想所成集合。我们也可以仅考虑为极大理想的 ${\mathfrak {p))$ 。当 $R$ 为链环时，对各极大理想的局部化皆有相同维数；代数几何处理的交换环通常都是链环。

例子与性质

例如在环 $(\mathbb {Z} /8\mathbb {Z} )[X,Y,Z]$ 中可考虑以下的素理想链

(2)\subsetneq (2,x)\subsetneq (2,x,y)\subsetneq (2,x,y,z)

因此 $\dim(\mathbb {Z} /8\mathbb {Z} )[X,Y,Z]\geq 3$ ；事实上可证明其维数确实为 3。以下是克鲁尔维数的几个一般性质：

零维的整环是域。
离散赋值环与戴德金整环是一维的。
若 $\dim R=k$ ，则 $k+1\leq \dim R[X]\leq 2k+1$ ；当 $R$ 为诺特环时则 $\dim R[X]=k+1$ 。
若 $k$ 为域，则 $\dim k[X_{1},\ldots ,X_{n}]=n$ 。
若 $B$ 为 $A$ -代数，同时又是有限生成的 $A$ -模，则 $\dim B=\dim A$ 。

与几何的关系

在代数几何中，一个概形的维数被定义为各局部环的克鲁尔维数的上确界；对于仿射概形 $X=\mathrm {Spec} A$ ，则回归到 $\dim X=\dim A$ 。

设 $k$ 为域， $R$ 是有限型 $k$ -整代数，这是代数几何中的主要案例。根据诺特正规化引理，存在非负整数 $d$ 及 $R$ 中彼此代数独立的元素 ${\displaystyle x_{1},\ldots ,x_{d))$ ，使得 $R$ 是有限生成之 $k[x_{1},\ldots ,x_{d}]$ -模，因此 $\dim R=d$ 。从几何观点看， $\mathrm {Spec} R$ 此时是 ${\displaystyle \mathbb {A} _{k}^{d))$ 的有限分歧覆盖，因而克鲁尔维数确实合乎下述几何直观：

$\dim \mathbb {A} _{k}^{d}=d$
若 $X\rightarrow Y$ 是分歧覆盖，则 $\dim X=\dim Y$ 。

特别是当 $k=\mathbb {C}$ 时，代数簇的克鲁尔维数等于复几何中定义的维数。

文献

H. Matsumura, Commutative algebra ISBN 0-8053-7026-9

查论编维度

数字维度	负维零维一维二维三维四维五维六维七维八维九维维度（多维空间）

空间维度	向量空间的维数欧几里得空间仿射空间射影空间自由模流形代数簇的维数（英语：Dimension of an algebraic variety）时空

其它维度	克鲁尔维数拓扑维数归纳维数豪斯多夫维数计盒维数分形维数自由度

多胞形	超平面超曲面超方形 N维球面长菱体（英语：Hyperrectangle）超半方形正轴形单纯形类五边形形类二十面体形超金字塔（英语：Hyperpyramid）

形状组成	极小面顶点边面胞 ... 维峰维脊维面体（极大面）

参见	超空间余维数内射维度、投射维度与同调维度正图形列表

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