Principal Component Analysis / Hebbian-based Max Eigenfilter
Updated Thu, 04 Jul 2019 06:43:07 +0000
% TASK 1. Let’s generate 800 random data on a 2-dimensional plane. The data
% are generated as 4 clusters, of which centers are located at (2,2), (-1,-2),
% (2,0) and (0,1). Each cluster has 200 data, of which distances from each
% center are randomly distributed with Gaussian distribution (standard
% deviation = 2, 2, 1, and 1, respectively).
% TASK 1-(a) Mark the generated data with dots (or circles) on a
% 2-dimensional space.
% TASK 1-(b) Conduct Principal Component Analysis based on eigenvector
% analysis. (You may use any library function for the
% eigenvector/eigenvalue calculation.) Show the principal axes and data
% projects on the axes.
% TASK 1-(c) Program and calculate the Hebbian-based maximum eigenfilter,
% and compare with the principal in (b).
Shujaat Khan (2023). Principal Component Analysis / Hebbian-based Max Eigenfilter (https://www.mathworks.com/matlabcentral/fileexchange/72052-principal-component-analysis-hebbian-based-max-eigenfilter), MATLAB Central File Exchange. Retrieved .
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