高斯二项式系数

高斯二项式系数被定义为：

${\displaystyle {m \choose r}_{q}={\begin{cases}{\frac {(1-q^{m})(1-q^{m-1})\cdots (1-q^{m-r+1})}{(1-q)(1-q^{2})\cdots (1-q^{r})}}&r\leq m\\0&r>m\end{cases}}}$ 

其中， m 和 r 是非负整数。 当 r = 0时值为1。

高斯二项式系数计算一个有限维向量空间的子空间数。令q表示一个有限域里的元素数目，则在q元有限域上n维向量空间的k维子空间数等于

${\displaystyle {\binom {n}{k}}_{q}.}$ 

${\displaystyle {0 \choose 0}_{q}={1 \choose 0}_{q}=1}$ 

${\displaystyle {1 \choose 1}_{q}={\frac {1-q}{1-q}}=1}$ 

${\displaystyle {2 \choose 1}_{q}={\frac {1-q^{2}}{1-q}}=1+q}$ 

${\displaystyle {3 \choose 1}_{q}={\frac {1-q^{3}}{1-q}}=1+q+q^{2}}$ 

${\displaystyle {3 \choose 2}_{q}={\frac {(1-q^{3})(1-q^{2})}{(1-q)(1-q^{2})}}=1+q+q^{2}}$ 

${\displaystyle {4 \choose 2}_{q}={\frac {(1-q^{4})(1-q^{3})}{(1-q)(1-q^{2})}}=(1+q^{2})(1+q+q^{2})=1+q+2q^{2}+q^{3}+q^{4}}$ 

和普通二项式系数一样, 高斯二项式系数是中心对称的:

${\displaystyle {m \choose r}_{q}={m \choose m-r}_{q}.}$ 

特别地,

${\displaystyle {m \choose 0}_{q}={m \choose m}_{q}=1\,,}$ 

${\displaystyle {m \choose 1}_{q}={m \choose m-1}_{q}={\frac {1-q^{m}}{1-q}}=1+q+\cdots +q^{m-1}\quad m\geq 1\,.}$ 

当 q = 1 时，有

${\displaystyle {m \choose r}_{1}={m \choose r}}$ 

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