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第704行:
第704行: − 互信息的规范化变量由约束系数、不确定系数或熟练程度提供: + 第710行:
第710行: − + 第722行:
第722行: − 这两个系数的值范围为[0,1] ,但不一定相等。在某些情况下,可能需要一个对称的度量,例如下面的冗余度量:+ 第733行:
第733行: − 当变量是独立的时候,它达到最小值为零,最大值为+ 第755行:
第755行: − 另一个对称度量是对称不确定度,由+ 第778行:
第778行: − 如果我们把互信息看作是总相关或对偶总相关的特殊情况,归一化版本分别为,+ 第788行:
第788行: − 这个标准化版本也被称为信息质量比率(IQR) ,它根据另一个变量量化了一个变量的信息量,以对抗总的不确定性: + 第805行:
第805行: − 有一个标准化的名字——它起源于最初把互信息看作是协方差的类比(因此香农熵类似于方差)。然后计算归一化互信息类似于皮尔逊相关系数,+
→标准化变形 Normalized variants
Normalized variants of the mutual information are provided by the coefficients of constraint, uncertainty coefficient or proficiency:
Normalized variants of the mutual information are provided by the coefficients of constraint, uncertainty coefficient or proficiency:
互信息的规范化变量由约束系数、不确定系数或熟练程度组成:
:<math>
:<math>
C_{XY} = \frac{\operatorname{I}(X;Y)}{H(Y)}
C_{XY} = \frac{\operatorname{I}(X;Y)}{H(Y)}
~~~~\mbox{and}~~~~
~~~~\mbox{和}~~~~
C_{YX} = \frac{\operatorname{I}(X;Y)}{H(X)}.
C_{YX} = \frac{\operatorname{I}(X;Y)}{H(X)}.
The two coefficients have a value ranging in [0, 1], but are not necessarily equal. In some cases a symmetric measure may be desired, such as the following redundancy measure:
The two coefficients have a value ranging in [0, 1], but are not necessarily equal. In some cases a symmetric measure may be desired, such as the following redundancy measure:
这两个系数的值范围均为[0,1],但不一定是相等的。在某些情况下,可能需要一个对称的度量,例如下面的冗余度量:
:<math>R = \frac{\operatorname{I}(X;Y)}{H(X) + H(Y)}</math>
:<math>R = \frac{\operatorname{I}(X;Y)}{H(X) + H(Y)}</math>
which attains a minimum of zero when the variables are independent and a maximum value of
which attains a minimum of zero when the variables are independent and a maximum value of
当变量是独立的时候,它的最小值为零,最大值可以达到:
Another symmetrical measure is the symmetric uncertainty , given by
Another symmetrical measure is the symmetric uncertainty , given by
另一个对称度量是对称不确定度,由下式表示:
If we consider mutual information as a special case of the total correlation or dual total correlation, the normalized version are respectively,
If we consider mutual information as a special case of the total correlation or dual total correlation, the normalized version are respectively,
如果我们把互信息看作是'''<font color="#ff8000">总相关 Total correlation</font>'''或'''<font color="#ff8000">对偶总相关 Dual total correlation</font>'''的特殊情况,则其标准化版本分别为,
:<math>\frac{\operatorname{I}(X;Y)}{\min\left[ H(X),H(Y)\right]}</math> and <math>\frac{\operatorname{I}(X;Y)}{H(X,Y)} \; .</math>
:<math>\frac{\operatorname{I}(X;Y)}{\min\left[ H(X),H(Y)\right]}</math> and <math>\frac{\operatorname{I}(X;Y)}{H(X,Y)} \; .</math>
This normalized version also known as Information Quality Ratio (IQR) which quantifies the amount of information of a variable based on another variable against total uncertainty:
This normalized version also known as Information Quality Ratio (IQR) which quantifies the amount of information of a variable based on another variable against total uncertainty:
这个标准化版本也被称为'''<font color="#ff8000">信息质量比率 Information Quality Ratio,IQR</font>''' ,它根据另一个变量量化了一个变量的信息量,来对抗总的不确定性:
:<math>IQR(X, Y) = \operatorname{E}[\operatorname{I}(X;Y)]
:<math>IQR(X, Y) = \operatorname{E}[\operatorname{I}(X;Y)]
There's a normalization which derives from first thinking of mutual information as an analogue to [[covariance]] (thus [[Entropy (information theory)|Shannon entropy]] is analogous to [[variance]]). Then the normalized mutual information is calculated akin to the [[Pearson product-moment correlation coefficient|Pearson correlation coefficient]],
There's a normalization which derives from first thinking of mutual information as an analogue to [[covariance]] (thus [[Entropy (information theory)|Shannon entropy]] is analogous to [[variance]]). Then the normalized mutual information is calculated akin to the [[Pearson product-moment correlation coefficient|Pearson correlation coefficient]],
有一个标准化的名字——它起源于最初把互信息看作是'''<font color="#ff8000">协方差 Covariance</font>'''的类比(因此香农熵类似于方差)。然后计算归一化互信息类似于'''<font color="#ff8000">皮尔森相关系数 Pearson product-moment</font>''':