(New page: Metric Space (X,d) <math>d:X \times X \rightarrow \Re ^{+}</math> X is set, not necessarily vector space <math>x, y, z \in X</math> 1. <math>d(x,y)=d(y,x)</math> 2. <math>d(x,z)\leq d(...)
 
 
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=Metrics and Similarity Measures=
 
Metric Space (X,d)
 
Metric Space (X,d)
 
<math>d:X \times X \rightarrow \Re ^{+}</math>
 
<math>d:X \times X \rightarrow \Re ^{+}</math>
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<math>x, y, z \in X</math>
 
<math>x, y, z \in X</math>
  
1. <math>d(x,y)=d(y,x)</math>
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#<math>d(x,y)=d(y,x)</math>
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#<math>d(x,z)\leq d(x,y)+d(y,z)</math>
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#<math>d(x,y) \geq 0, d(x,y)=0 \Leftrightarrow x=y)</math>
  
2. <math>d(x,z)\leq d(x,y)+d(y,z)</math>
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If X is vector space, metric can be induced by the norm <math>||\cdot||</math>.
  
3. <math>d(x,y \geq 0, d(x,y)=0 \Leftrightarrow x=y)</math>
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<math>d(x,y)=||y-x||</math>
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Norm is defined as follows
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<math>||\cdot||: X \rightarrow \Re ^{+}</math>
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#<math>|x| \geq 0, ||x||=0 \Leftrightarrow x=0</math>
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#<math>||\alpha x||=|\alpha | ||x||</math>
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#<math>||x+y|| \leq ||x|| + ||y||</math>
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[[Category:ECE662]]
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Defining metric, we can measure similarity of elements of set X.
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Example of metric
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#Minkowski Metric <math> \left( \sum_{i=1}^n \left| x_i - y_i \right|^p \right)^{1/p}</math>
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#Riemannian Metric <math>D(\vec{x_1},\vec{x_2})=\sqrt{(\vec{x_1}-\vec{x_2})^\top \mathbb{M}(\vec{x_1}-\vec{x_2})}</math>
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#Tanimoto metric <math>D(S_1, S_2) = \frac {|S_1|+|S_2|-2|S_1 \bigcap S_2| }{|S_1|+|S_2|-|S_1 \bigcap S_2|} </math>
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#Procrustes metric <math>D(p,\bar p)= min_{R,T} \sum_{i=1}^n
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{\begin{Vmatrix} Rp_i+T-\bar p_i \end{Vmatrix}} _{L^2} </math>, R: Rotation, T: Translation
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[[ECE662:BoutinSpring08_OldKiwi|Back to ECE662 Spring 2008]]

Latest revision as of 02:54, 12 April 2012

Metrics and Similarity Measures

Metric Space (X,d) $ d:X \times X \rightarrow \Re ^{+} $

X is set, not necessarily vector space

$ x, y, z \in X $

  1. $ d(x,y)=d(y,x) $
  2. $ d(x,z)\leq d(x,y)+d(y,z) $
  3. $ d(x,y) \geq 0, d(x,y)=0 \Leftrightarrow x=y) $

If X is vector space, metric can be induced by the norm $ ||\cdot|| $.

$ d(x,y)=||y-x|| $

Norm is defined as follows

$ ||\cdot||: X \rightarrow \Re ^{+} $

  1. $ |x| \geq 0, ||x||=0 \Leftrightarrow x=0 $
  2. $ ||\alpha x||=|\alpha | ||x|| $
  3. $ ||x+y|| \leq ||x|| + ||y|| $

Defining metric, we can measure similarity of elements of set X.

Example of metric

  1. Minkowski Metric $ \left( \sum_{i=1}^n \left| x_i - y_i \right|^p \right)^{1/p} $
  2. Riemannian Metric $ D(\vec{x_1},\vec{x_2})=\sqrt{(\vec{x_1}-\vec{x_2})^\top \mathbb{M}(\vec{x_1}-\vec{x_2})} $
  3. Tanimoto metric $ D(S_1, S_2) = \frac {|S_1|+|S_2|-2|S_1 \bigcap S_2| }{|S_1|+|S_2|-|S_1 \bigcap S_2|} $
  4. Procrustes metric $ D(p,\bar p)= min_{R,T} \sum_{i=1}^n {\begin{Vmatrix} Rp_i+T-\bar p_i \end{Vmatrix}} _{L^2} $, R: Rotation, T: Translation

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