Using and Reading PCA Statistical Results

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balsip 2017 年 6 月 8 日

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https://jp.mathworks.com/matlabcentral/answers/343873-using-and-reading-pca-statistical-results

回答済み: Shivansh 2024 年 5 月 26 日

Using pca() with a 7627x17 matrix of variables (columns = variables, rows = observations), I am outputting the coeff and explained as the pca() help page details.

Question 1: Does the input matrix require the last column to be the response/dependent variable (like stepwiselm() and fitlm())? If no, how are these results being calculated without the response/dependent variable involved?

Question 2: Am I right in this interpretation of the results below by saying the third predictor variable comprises ~0.995 of the influence of the first principle component, which explains 88.6% of the predictor variable variance? If that's correct, then how is this newfound info useful in explaining my response/dependent variable?

Somebody set me straight, please. Ultimately, my goal is to determine which original predictor variables explains the response variable the best, and then quantify that. My thought was to take the most influential variables as determined by PCA and then build the model using stepwiselm() or fitlm().

coeff:
00129729002558727  0.289549385373420  0.956728609103309  -0.0212665364089570
-0.0953914970117933  0.952329812960381  -0.287992542335858  0.0187816335691187
995206207590380  0.0910468102726022  -0.0294065217015872  -0.0186854868976485
-0.000397082225762763  -0.00246282907057587  0.00447608503472252  -0.0110332572889799
00322274954398379  -0.0226606357739981  -0.00261825636192142  0.0575596465344526
-0.000101350632956080  -6.19964461638700e-06  -1.49483017598818e-05  -5.08226633593425e-05
00852263907323397  0.0165679978418983  0.00865470258457646  0.128426646955215
00104561882463731  -0.00110133731797852  0.00439471539229791  -0.000299508982820549
00121992923377658  -0.000898286153472998  0.00374785080734514  0.00364889452050408
00119226703173668  -0.00114898617310396  0.00212207512452650  0.00644443091048378
000748542020111456  -0.00201026790580145  -0.00109958052522231  0.00763259394674056
-0.000523073666889972  -0.00286022621479378  0.00406153294859059  0.00776832543962255
-0.000417086918391104  -0.00115684825783806  0.00631626569801059  0.00530098022903176
000918261002587542  0.00258292617487317  0.00785296732106662  0.00108255503976634
000864124551517556  0.00145714217693526  0.00281347075801307  -0.00354952384903065
-9.23014821423366e-05  0.000388571081226511  0.000173062207881905  -0.00110996732336648
0193283447001054  -0.0109382094403551  0.0244754518699291  0.989293153560380
explained:
6118904456048
77262546524695
07011007727990
437152292606406
0639436168558254
0223883103766897
0106035177147705
00808530454905423
00161881588630160
000820663786317213
000409453989136154
000267674592543745
93610602222986e-05
25607722914739e-06
80587204580441e-07
42789942911271e-07
09966934592139e-08

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Answer 1

Shivansh 2024 年 5 月 26 日

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https://jp.mathworks.com/matlabcentral/answers/343873-using-and-reading-pca-statistical-results#answer_1463526

Hi Balsip!

PCA (Principal Component Analysis) does not require the last column to be the response or dependent variable. PCA is an unsupervised learning technique used primarily for dimensionality reduction or to identify patterns in data based on the correlation between features.

For the second part, your interpretation is correct that the third predictor significantly influences the first principal component, accounting for 88.6% of the variance in predictors. However, PCA does not directly relate predictors to a response variable. For understanding which predictors best explain the response, use influential variables from PCA in regression models like "stepwiselm" or "fitlm".

You can refer to the following documentations for more information: