Diff for "FAQ/euclid" - CBU statistics Wiki
location: Diff for "FAQ/euclid"
Differences between revisions 1 and 12 (spanning 11 versions)
Revision 1 as of 2010-07-01 14:58:49
Size: 1026
Editor: PeterWatson
Comment:
Revision 12 as of 2011-09-02 08:52:33
Size: 1609
Editor: PeterWatson
Comment:
Deletions are marked like this. Additions are marked like this.
Line 1: Line 1:
= What is Euclidean distance and how do I compute it ? =
Line 2: Line 3:
= What is the formula for Euclidean distance ? = Euclidean distance measures the distance between two vectors of length t denoting t traits of various observations and is a specific example of Mahalanobis distance with an identity covariance matrix (ie uncorrelated traits).
Line 4: Line 5:
Euclidean distance measures the distance between two vectors of length p denoting p traits of various observations and is a specific example of Mahalanobis distance with an identity covariance matrix (ie uncorrelated traits).

ED = for vectors, observations with vectors $$x_text{i} = (x_text{1i}, ..., x_text_{pi})^text{T}$$ and $$x_text{j} = (x_text{1j}, ..., x_text_{pj})^text{T}$$ equals $$ \sqrt{x_text{i} - x_text{j})^text{T)(x_text{i} - x_text{j})}$$
ED = for vectors, observations with vectors $$x_text{i} = (x_text{1i}, ..., x_text{ti})^text{T}$$ and $$x_text{j} = (x_text{1j}, ..., x_text{tj})^text{T}$$ equals $$ \sqrt{(x_text{i} - x_text{j})^text{T}(x_text{i} - x_text{j})}$$
Line 9: Line 8:
$$ \sqrt{(x_text{1i}-x_text{1j})^text{2} + .. + (x_text{pi}-x_text{pj})^text{2}}$$ $$ \sqrt{(x_text{1i}-x_text{1j})^text{2} + .. + (x_text{ti}-x_text{tj})^text{2}}$$
Line 11: Line 10:
The Euclidean distance is the distance on a graph between two points. This is easily seen in two dimensions since by Pythagoras's theorem the distance (hypoteneuse) between two points (x11, x21) and (x12, x22) equals the square root of the squared difference in x and y co-ordinates =
square root of (x11-x12)(x11-x12) + (x21-x22)(x22-x21). See [attachment:euclide.bmp here.]
The Euclidean distance is the distance on a graph between two points. This is easily seen in two dimensions since by Pythagoras's theorem the linear distance (hypotenuse) between two points (x11, x21) and (x12, x22) equals the square root of the squared difference in x and y co-ordinates = square root of (x11-x12)(x11-x12) + (x21-x22)(x22-x21). See [attachment:euclide.bmp here.]
Line 14: Line 12:
The Euclidean ditance is a special case of Mahalanobis distance which is used for measuring multivariate group distances or [:FAQ/mahal: distance of an observation from its group means] ie with 2 or more predictors. In particular it is the square root of the Mahalanobis distance, D^2, with the covariance matrix replaced by the identity matrix. D^2 is defined in, for example, Campbell, Donner and Webster (1991).

__Reference__

Campbell MK, Donner, A and Webster, KM (1991) Are ordinal models useful for classification? ''Statistics in Medicine'' '''10''' 383-394.

What is Euclidean distance and how do I compute it ?

Euclidean distance measures the distance between two vectors of length t denoting t traits of various observations and is a specific example of Mahalanobis distance with an identity covariance matrix (ie uncorrelated traits).

ED = for vectors, observations with vectors $$x_text{i} = (x_text{1i}, ..., x_text{ti})text{T}$$ and $$x_text{j} = (x_text{1j}, ..., x_text{tj})text{T}$$ equals $$ \sqrt{(x_text{i} - x_text{j})^text{T}(x_text{i} - x_text{j})}$$

This can be written in long hand as $$ \sqrt{(x_text{1i}-x_text{1j})text{2} + .. + (x_text{ti}-x_text{tj})text{2}}$$

The Euclidean distance is the distance on a graph between two points. This is easily seen in two dimensions since by Pythagoras's theorem the linear distance (hypotenuse) between two points (x11, x21) and (x12, x22) equals the square root of the squared difference in x and y co-ordinates = square root of (x11-x12)(x11-x12) + (x21-x22)(x22-x21). See [attachment:euclide.bmp here.]

The Euclidean ditance is a special case of Mahalanobis distance which is used for measuring multivariate group distances or [:FAQ/mahal: distance of an observation from its group means] ie with 2 or more predictors. In particular it is the square root of the Mahalanobis distance, D2, with the covariance matrix replaced by the identity matrix. D2 is defined in, for example, Campbell, Donner and Webster (1991).

Reference

Campbell MK, Donner, A and Webster, KM (1991) Are ordinal models useful for classification? Statistics in Medicine 10 383-394.

None: FAQ/euclid (last edited 2013-03-08 10:17:55 by localhost)