Principal Components Analysis: Difference between revisions

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''Note that the output is not sorted by relative importance. In this example the second principal component (accounts for 13.26% of the original variance) can be created by using numbers (i.e. the W lines) from the third group of eigen vectors. To compare with princomp()'s results look at the column '''Comp.2''' below''.





Revision as of 09:59, 20 April 2009

Under Construction

This page is a short and practical introduction in Principal Component Analysis. It aims to highlight the importance of the values returned by PCA. In addition, it addresses numerical accuracy issues with respect to the default implementation of PCA in GRASS through the i.pca module.


Principal Component Analysis

Principal Component Analysis (PCA) is a dimensionality reduction technique used extensively in Remote Sensing studies (e.g. in change detection studies, image enhancement tasks and more). PCA is in fact a linear transformation applied on (usually) highly correlated multidimensional (e.g. multispectral) data. The input dimensions are transformed in a new coordinate system in which the produced dimensions (called principal components) contain, in decreasing order, the greatest variance related with unchanged landscape features.


PCA has two algebraic solutions:

  • Eigenvectors of Covariance (or Correlation) of a given data matrix
  • Singular Value Decomposition of a given data matrix


The SVD method is used for numerical accuracy [R Documentation]


Background

The basic steps of the transformation are:

  1. organizing a dataset in a matrix
  2. data centering (that is: subtracting the dimensions means from themself so each of the dimensions in the dataset has zero mean)
  3. calculate
    • the covariance matrix (non-standardised PCA) or
    • the correlation matrix (standardised PCA, also known as scaling)
  4. calculate either
    • the eigenvectors and eigenvalues of the covariance (or the correlation) matrix or
    • the SVD of the data matrix
  5. sort variances in decreasing order (decreasing eigenvalues; this is default in eigenvalue analysis)
  6. project original dataset signals (PC's or PC scores: eigenvector * input-data) to get


Solutions to PCA

The Eigenvector solution to PCA involves:

  1. calculation of
    • the covariance matrix of the given multidimensional dataset (non-standardised PCA) or
    • the correlation matrix of the given multidimensional dataset (standardised PCA)
  2. calculation of the eigenvalues and eigenvectors of the covariance (or correlation) matrix
  3. transformation of the input dataset using the eigenvalues as weighting coefficients


Terminology

eigenvalues represent either the variance of the original data contained in each principal component (in case they were computed from the covariance matrix), or the amount of correlation captured by the respective principle components (in case they were computed from the correlation matrix).

eigenvectors

  • act as weighting coefficients
  • represent the contribution of each original dimension the principal components
  • tell how the principle components relate to the the data variables (dimensions).

Suppose an eigenvector is (0, 0, 1, 0), this indicates that the corresponding principle component is equal to dimension 3 and perpendicular to dimensions 1, 2 and 4. If it is (0.7, 0.7, 0, 0) the PC is equally determined by dimension 1 and 2 (it averages them), and not determined by dimensions 3 and 4. If it is (0.7, 0, -0.7, 0) it is the difference between dimension 1 and 3. Eigenvectors are normalized, meaning that the sum of its squared elements equals 1.

loadings The individual numbers in an eigenvector are called loadings.

scores When the original data are projected onto the eigenvectors, the resulting new variables are called the principle components; the new data values are called PC scores.

Performing PCA with GRASS

  • m.eigensystem

The m.eigensystem module implements the eigenvector solution to PCA. The respective function in R is princomp(). A comparison of their results confirms their almost identical performance. Specifically,

  1. the standard deviations (sdev) reported by princomp() are (almost) identical with the variances (eigenvalues) reported by m.eigensystem.
  1. princomp() scales (also referred as normalization) the eigenvectors and so does m.eigensystem. The scaled(=normalised) eigenvectors produced by m.eigensystem are marked with the capital letter N.


  • i.pca

The i.pca module performs PCA based on the SVD solution without data centering and/or scaling.

NOT ALWAYS!! Need to rescale MODIS bands to a range similar to the SPOT (e.g. 0 ~ 255) and check results.

A comparison of the results derived by i.pca and R's prcomp() function confirms this. Specifically, i.pca yields the same eigenvectors as R's prcomp() function does with the following options:

prcomp(x, center=FALSE, scale=FALSE)

where x is a numeric or complex matrix (or data frame) which provides the data for the principal components analysis (R Documentation).

Issues concerning the i.pca module

??? To add... ???

Issues concerning R's princomp() function

If one computes principle components with R, the loadings are printed by default such that loadings close to 0 (between -.1 and .1, this can be controlled) are left out. This can be overriden (see the help page of function loadings). The reason for this is that for large loading tables, the real information is in loadings not close to 0; reading large loading tables is much easier when only important loadings are printed.

Examples using SPOT imagery

Get SPOT images from the Spearfish dataset


Eigenvectors solution

Based on the covariance matrix

Using m.eigensystem

Note: download m.eigensystem from GRASS_AddOns#m.eigensystem GRASS-Addons


Command in one line

(echo 3; r.covar spot.ms.1,spot.ms.2,spot.ms.3) | m.eigensystem


Output

r.covar: complete ...
 100%
E      1159.7452017844          .0000000000    88.38
V          .6910021591          .0000000000
V          .7205280412          .0000000000
V          .4805108400          .0000000000
N          .6236808478          .0000000000
N          .6503301526          .0000000000
N          .4336967751          .0000000000
W        21.2394712045          .0000000000
W        22.1470141296          .0000000000
W        14.7695575384          .0000000000

E         5.9705414972          .0000000000      .45
V          .7119385973          .0000000000
V         -.6358200627          .0000000000
V         -.0703936743          .0000000000
N          .7438340890          .0000000000
N         -.6643053754          .0000000000
N         -.0735473745          .0000000000
W         1.8175356507          .0000000000
W        -1.6232096923          .0000000000
W         -.1797107407          .0000000000

E       146.5031967184          .0000000000    11.16
V          .2265837636          .0000000000
V          .3474697082          .0000000000
V         -.8468727535          .0000000000
N          .2402770238          .0000000000
N          .3684685345          .0000000000
N         -.8980522763          .0000000000
W         2.9082771721          .0000000000
W         4.4598880523          .0000000000
W       -10.8698904856          .0000000000

Note that the output is not sorted by relative importance.

Using R's princomp() function

Launch R from within GRASS

R


Load spgrass6() and projection information in R

library(spgrass6)
G <- gmeta6()


Read spot.ms bands

spot.ms <- readRAST6(c('spot.ms.1', 'spot.ms.2', 'spot.ms.3'))


Work around NA's

spot.ms.nas <- which(is.na(spot.ms@data$spot.ms.1) & is.na(spot.ms@data$spot.ms.2) & is.na(spot.ms@data$spot.ms.3))
spot.ms.values <- which(!is.na(spot.ms@data$spot.ms.1) & !is.na(spot.ms@data$spot.ms.2) & !is.na(spot.ms@data$spot.ms.3))
spot.ms.nonas <- spot.ms.values@data[spot.ms.values, ]


Command

princomp(spot.ms.nonas)


Output

Call:
princomp(x = modis)
Standard deviations:
  Comp.1   Comp.2   Comp.3
34.055018 12.103846  2.443468

3  variables and  1231860 observations.


Get loadings

princomp(spot.ms.nonas)$loadings
Loadings:
    Comp.1 Comp.2 Comp.3
spot.ms.1 -0.624  0.240  0.744
spot.ms.2 -0.650 -0.368 -0.664
spot.ms.3 -0.434  0.898 

               Comp.1 Comp.2 Comp.3
SS loadings     1.000  1.000  1.000
Proportion Var  0.333  0.333  0.333
Cumulative Var  0.333  0.667  1.000

The bold and red colored loadings, that is, the eigen vectors of the first principal component, ease of the comparison with the results derived from GRASS' m.eigensystem module above. Note the missing eigen value in row 3, column 3. It is omitted on purpose. You will appreciate how useful this is when you compute 20 PC's from 120 dimensions. It will be printed when you explicitly ask for showing loadings between -.1 and .1, by

print(princomp(spot.ms.nonas)$loadings, cutoff=0)

Based on the correlation matrix

Using m.eigensystem

Command in one line

(echo 3; r.covar -r spot.ms.1,spot.ms.2,spot.ms.3) | m.eigensystem


Output

r.covar: complete ...
 100%
E         2.5897901435          .0000000000    86.33
V         -.7080795162          .0000000000
V         -.6979341819          .0000000000
V         -.6128387525          .0000000000
N         -.6062688915          .0000000000
N         -.5975822957          .0000000000
N         -.5247222419          .0000000000
W         -.9756579133          .0000000000
W         -.9616787268          .0000000000
W         -.8444263177          .0000000000

E          .0123265666          .0000000000      .41
V         -.6690685456          .0000000000
V          .6302711261          .0000000000
V          .0552608155          .0000000000
N         -.7265842171          .0000000000
N          .6844516242          .0000000000
N          .0600112449          .0000000000
W         -.0806690651          .0000000000
W          .0759912909          .0000000000
W          .0066627528          .0000000000

E          .3978832898          .0000000000    13.26
V          .3005969725          .0000000000
V          .3883277727          .0000000000
V         -.7895613377          .0000000000
N          .3232853332          .0000000000
N          .4176378502          .0000000000
N         -.8491555920          .0000000000
W          .2039218921          .0000000000
W          .2634375639          .0000000000
W         -.5356302845          .0000000000

Note that the output is not sorted by relative importance. In this example the second principal component (accounts for 13.26% of the original variance) can be created by using numbers (i.e. the W lines) from the third group of eigen vectors. To compare with princomp()'s results look at the column Comp.2 below.


Using R's princomp() function

Perform PCA

princomp(spot.ms.nonas, cor=TRUE)


Output

Call:
princomp(x = spot.ms.nonas, cor = TRUE)

Standard deviations:
   Comp.1    Comp.2    Comp.3 
1.6092826 0.6307795 0.1110256

3  variables and  1231860 observations.


Get loadings

princomp(spot.ms.nonas, cor=TRUE)$loadings


Output

Loadings:
          Comp.1 Comp.2 Comp.3
spot.ms.1 -0.606 -0.323  0.727
spot.ms.2 -0.598 -0.418 -0.684
spot.ms.3 -0.525  0.849       

               Comp.1 Comp.2 Comp.3
SS loadings     1.000  1.000  1.000
Proportion Var  0.333  0.333  0.333
Cumulative Var  0.333  0.667  1.000

SVD solution

Using i.pca

Command

i.pca input=spot.ms.1,spot.ms.2,spot.ms.3 out=pca.spot.ms rescale=0,0


Output

 Eigen values, (vectors), and [percent importance]:
  PC1   1170.12 (-0.6251,-0.6536,-0.4268)[88.07%]
  PC2    152.49 ( 0.2328, 0.3658,-0.9011)[11.48%]
  PC3      6.01 ( 0.7450,-0.6626,-0.0765) [0.45%]

Using R's prcomp() function

The following example replicates i.pca's solution using the same data with data centering and without scaling (options center=TRUE and scale=FALSE). Note that these settings are the defaults.


Command

prcomp(spot.ms.nonas)

Output

Standard deviations:
[1] 34.055032 12.103851  2.443469

Rotation:
                 PC1        PC2         PC3
spot.ms.1 -0.6236808  0.2402770 -0.74383409
spot.ms.2 -0.6503302  0.3684685  0.66430538
spot.ms.3 -0.4336968 -0.8980523  0.07354738


Comments

In this example i.pca's performance seems to be identical to R's prcomp() function which means that data centering is applied prior to the actual PCA.


The three SPOT bands used in this example have the following ranges:

  • spot.ms.1
min=24
max=254
  • spot.ms.2
min=14
max=254
  • spot.ms.3
min=12
max=254


Nevertheless, as shown in the examples using MODIS surface reflectance products (read below) in which the range of the bands varies significantly, i.pca's results do not match the results of R's prcomp() function with the parameter center set to TRUE. Instead, the results derived from i.pca are almost identical when the parameter center is set to FALSE.


The following example performs PCA without data centering and scaling (options center=FALSE and scale=FALSE).


Command

prcomp(spot.ms.nonas, center=FALSE, scale=FALSE)


Output

Standard deviations:
[1] 101.00927  15.79861   2.83775

Rotation:
                 PC1        PC2        PC3
spot.ms.1 -0.5605487 -0.3652694  0.7432116
spot.ms.2 -0.4726613 -0.5958032 -0.6493149
spot.ms.3 -0.6799827  0.7152600 -0.1613280


Comments

+++


The following example performs PCA with data centering and scaling (options center=TRUE and scale=TRUE)


Command

prcomp(spot.ms.nonas, center=TRUE, scale=TRUE)

Output

Standard deviations:
[1] 1.6092826 0.6307795 0.1110256

Rotation:
                 PC1        PC2         PC3
spot.ms.1 -0.6062688  0.3232856 -0.72658417
spot.ms.2 -0.5975823  0.4176378  0.68445170
spot.ms.3 -0.5247224 -0.8491555  0.06001103

Examples using MODIS surface reflectance products

Eigenvectors solution

Based on the covariance matrix

Using m.eigensystem

Command in one line

(echo 3; r.covar b02,b06,b07) | m.eigensystem


Output

  • The E line is the eigen value. (Real part, imaginary part, percent importance)
  • The V lines are the eigen vectors associated with E.
  • The N lines are the V vectors normalized to have a magnitude of 1. These are the scaled eigen vectors that correspond to princomp()'s results presented in the following section.
  • The W lines are the N vector multiplied by the square root of the magnitude of the eigen value (E).
r.covar: complete ...
100%
E    778244.0258462029          .0000000000    79.20
V          .5006581842          .0000000000
V          .8256483300          .0000000000
V          .6155834548          .0000000000
N          .4372107421          .0000000000
N          .7210155161          .0000000000
N          .5375717557          .0000000000
W       385.6991853500          .0000000000
W       636.0664787886          .0000000000
W       474.2358050886          .0000000000

E    192494.5769628266          .0000000000    19.59
V         -.8689798010          .0000000000
V          .0996340298          .0000000000
V          .5731134848          .0000000000
N         -.8309940700          .0000000000
N          .0952787255          .0000000000
N          .5480609638          .0000000000
W      -364.5920328433          .0000000000
W        41.8027823088          .0000000000
W       240.4573848757          .0000000000

E     11876.4548199713          .0000000000     1.21
V          .2872248982          .0000000000
V         -.5731591248          .0000000000
V          .5351449518          .0000000000
N          .3439413070          .0000000000
N         -.6863370819          .0000000000
N          .6408165005          .0000000000
W        37.4824307850          .0000000000
W       -74.7964308085          .0000000000
W        69.8356366100          .0000000000


In general, the solution to the eigen system results in complex numbers (with both real and imaginary parts). However, in the example above, since the input matrix is symmetric (i.e., inverting the rows and columns gives the same matrix) the eigen system has only real values (i.e., the imaginary part is zero). This fact makes it possible to use eigen vectors to perform principle component transformation of data sets. The covariance or correlation matrix of any data set is symmetric and thus has only real eigen values and vectors.

Note The red-bold eigen vectors of the first principal component, ease of the comparison with the results derived from R's princomp() function that follows.


Using the W vector, new maps can be created:

r.mapcalc 'pc.1 =  385.6992*map.1 +636.0665*map.2 + 474.2358*map.3'
r.mapcalc 'pc.2 = -364.5920*map.1 + 41.8027*map.2 + 240.4573*map.3'
r.mapcalc 'pc.3 =   37.4824*map.1 - 74.7964*map.2 +  69.8356*map.3'

Using R's princomp() function

Command

princomp(modis)


Output

Call:
princomp(x = modis)
Standard deviations:
  Comp.1   Comp.2   Comp.3
857.5737 436.0922 108.5083
3  variables and  350596 observations.


Get loadings

(princomp(modis))$loadings
Loadings:
    Comp.1 Comp.2 Comp.3
b02 -0.418  0.839  0.348
b06 -0.725        -0.684
b07 -0.547 -0.539  0.641
               Comp.1 Comp.2 Comp.3
SS loadings     1.000  1.000  1.000
Proportion Var  0.333  0.333  0.333
Cumulative Var  0.333  0.667  1.000


The bold and red colored loadings, that is, the eigen vectors of the first principal component, ease of the comparison with the results derived from GRASS' m.eigensystem module above. Note the missing eigen value in row 2, column 2. For some reason R refused to yield it.

Based on the correlation matrix

Using m.eigensystem

Command in one line

(echo 3; r.covar -r MOD07_b02,MOD07_b06,MOD07_b07)|m.eigensystem


Output

r.covar: complete ...
 100%
E         2.2915877718          .0000000000    76.39
V         -.5755655569          .0000000000
V         -.7660355041          .0000000000
V         -.6809380186          .0000000000
N         -.4896413269          .0000000000
N         -.6516766616          .0000000000
N         -.5792830912          .0000000000
W         -.7412186091          .0000000000
W         -.9865075560          .0000000000
W         -.8769182329          .0000000000

E          .6740687010          .0000000000    22.47
V          .8667178982          .0000000000
V         -.1116525720          .0000000000
V         -.6069908335          .0000000000
N          .8145815825          .0000000000
N         -.1049362531          .0000000000
N         -.5704780699          .0000000000
W          .6687852213          .0000000000
W         -.0861544341          .0000000000
W         -.4683721194          .0000000000

E          .0343435272          .0000000000     1.14
V          .2486404469          .0000000000
V         -.6006166822          .0000000000
V          .4655120098          .0000000000
N          .3109794470          .0000000000
N         -.7512029762          .0000000000
N          .5822249325          .0000000000
W          .0576307320          .0000000000
W         -.1392129859          .0000000000
W          .1078979635          .0000000000

The bold and red colored eigen vectors of the second principal component, ease of the comparison with the results derived from R's princomp() function that follows.


Using R's princomp() function

Command

princomp(mod07, cor=TRUE)


Output

Call:
princomp(x = mod07, cor = TRUE)
Standard deviations:
   Comp.1    Comp.2    Comp.3
1.5030740 0.8397807 0.1885121

 3  variables and  350596 observations.


Get loadings

(princomp(mod07, cor=TRUE))$loadings


Output

Loadings:
                             Comp.1 Comp.2 Comp.3
MOD2007_242_500_sur_refl_b02 -0.481  0.820  0.310
MOD2007_242_500_sur_refl_b06 -0.656 -0.102 -0.748
MOD2007_242_500_sur_refl_b07 -0.582 -0.563  0.587

               Comp.1 Comp.2 Comp.3
SS loadings     1.000  1.000  1.000
Proportion Var  0.333  0.333  0.333
Cumulative Var  0.333  0.667  1.000

The bold and red colored loadings, that is, the eigen vectors of the second component, ease of the comparison with the results derived from GRASS' m.eigensystem module above.


Comments Add comments here...

SVD solution

Using i.pca

Command

i.pca input=b2,b6,b7 output=pca.b267


Output

Eigen values, (vectors), and [percent importance]:
PC1  6307563.04 ( -0.64, -0.65, -0.42 ) [ 98.71% ]
PC2    78023.63 ( -0.71,  0.28,  0.64 ) [  1.22% ]
PC3     4504.60 ( -0.30,  0.71, -0.64 ) [  0.07% ] 


Using R's prcomp() function

The following example replicates i.pca's solution, that is, using the same data without data centering and/or scaling (options center=FALSE and scale=FALSE).


Command

prcomp(mod07, center=FALSE, scale=FALSE) <<== this corresponds to i.pca


Output

Standard deviations:
[1] 4288.3788  476.8904  114.3971
Rotation:
                                   PC1        PC2        PC3
MOD2007_242_500_sur_refl_b02 -0.6353238  0.7124070 -0.2980602
MOD2007_242_500_sur_refl_b06 -0.6485551 -0.2826985  0.7067234
MOD2007_242_500_sur_refl_b07 -0.4192135 -0.6423066 -0.6416403


Comments

  • The eigenvector matrices match although prcomp() reports loadings (=eigenvectors) column-wise and i.pca row-wise.
  • The eigenvalues do not match. To exemplify, the standard deviation for PC1 reported by prcomp() is 4288.3788 and the variance reported by i.pca is 6307563.04 [ sqrt(6307563.04) = 2511.486 ]


More examples to be added


References

Jon Shlens, "Tutorial on Principal Component Analysis, Dec 2005," [1] (accessed on March, 2009).


e-mails in GRASS-user mailing list

There are many posts concerning the functionality of i.pca. Most of them are questioning the non-reporting of eigenvalues (an issue recently fixed).


Old posts

[2]


Recent posts

Testing i.pca ~ prcomp(), m.eigensystem ~ princomp()

[3]

[4]

[5]


More sources to be added