Lecture Topic Projects 1 Intro, schedule, and logistics 2 Applications of visual analytics, data types 3 Data sources and preparation Project 1 out 4
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2 Lecture Topic Projects 1 Intro, schedule, and logistics 2 Applications of visual analytics, data types 3 Data sources and preparation Project 1 out 4 Data reduction, similarity & distance, data augmentation 5 Dimension reduction 6 Introduction to D3 7 Visual perception and cognition Project 2 out 8 Visual design and aesthetic 9 Visual analytics tasks 10 Cluster analysis 11 High-dimensional data, dimensionality reduction 12 Principal component analysis (PCA) 13 Visualization of spatial data: volume visualization intro Project 3 out 14 Introduction to GPU programming 15 Visualization of spatial data: raycasting, transfer functions 16 Illumination and isosurface rendering 17 Midterm 18 Scientific visualization 19 Non-photorealistic and illustrative rendering Project 4 out 20 Midterm discussion 21 Principles of interaction 22 Visual analytics and the visual sense making process 23 Visualization of graphs and hierarchies 24 Visualization of time-varying and streaming data Project 5 out 25 Maps 26 Memorable visualizations, visual embellishments 27 Evaluation and user studies 28 Narrative visualization, storytelling, data journalism, XAI
3 Data Reduction
4 3D 2D Dimension Reduction
5 Are there attributes that go together? Can you name a few?
6 Physical attributes color number of doors number of wheels retractable roof height length frames around side windows Which attributes are useful to distinguish SUVs from convertibles? number of doors (4 vs. 2) --> numerical, two levels retractable roof (no vs. yes) --> categorical, two levels frames around side windows (yes vs. no) --> categorical, two levels height (higher vs. lower) --> numerical, many levels
7 Which attributes are not so useful? number of wheels (constant 4) --> no discriminative power length (short and long SUVs, convertibles) --> confounding color (colors are seemingly random, or are they?) Is color useful? the convertibles seem to have more vibrant colors (red, yellow, ) so maybe we made a discovery
8 retractable roof a new type of SUV frames around side windows Need to consider more than two attributes height attribute would have distinguished the Range Rover from the convertibles and caused it to be and outlier
9 retractable roof why can empty feature spaces be interesting or useful? new class: the convertible SUV New classes are constantly evolving over time height this is known as cluster evolution measuring more features will increase the chance of discovery
10 The more data (examples) the better increases the chances to discover the rare specimen but some attributes are useless we can cull them away perform attribute reduction or dimension reduction
11 By axis rotation determine a more efficient basis Principal Component Analysis (PCA) Singular value decomposition (SVD) Latent semantic analysis (LSA) By type transformation determine a more efficient data type Fourier analysis and Wavelets for grids Multidimensional scaling (MSD) for graphs Locally Linear Embedding Isomap Self Organizing Maps (SOM) Linear Discriminant Analysis (LDA)
12
13 Covariance measures how much two random variables change together For N variable we have N 2 variable pairs we can write them in a matrix of size N 2 the covariance matrix for two variables X 1 and X 2
14 Covariance cov(x,y) mean of all data item values x i and y i for attributes X and Y, resp. Pearson s correlation r r xy is covariance normalized by the individual variances for X and Y n i 1 ( x x)( y y) i n n 2 2 ( xi x) ( yi x) i 1 i 1 i individual variances for attributes X and Y
15 Correlation rates between -1 and 1: Important to note: correlation is defined for linear relationships visualization can help none of these point distributions have correlations:
16 Analytical: Samples: Cov( X, Y ) E[( X )( Y )] cov ( x x)( y y) xy xy i i i 1 n x y An n-d dataset has n variables x 1, x 2, x n define pairwise covariance among all of these variables construct a covariance matrix a correlation matrix would just list the correlations instead
17 just value distribution (scatterplot matrix)
18 Ultimate goal: find a coordinate system that can represent the variance in the data with as few axes as possible rank these axes by the amount of variance (blue, red) drop the axes that have the least variance (red)
19 5 4 2nd Principal Component, y 2 1st Principal Component, y
20 Find the principal components (factors) of a distribution First characterize the distribution by covariance matrix Cov correlation matrix Corr lets call it C perform QR factorization or LU decomposition to get C Q Q 1 Q: matrix with Eigenvectors : diagonal matrix with Eigenvalues l now order the Eigenvectors in terms of their Eigenvalues l
21 5 λ 1 λ
22 When to use what? use the covariance matrix when the variable scales are similar use the correlation matrix when the variables are on different scales the correlation matrix standardizes the data in general they give different results, especially when the scales are different
23 Before PCA 8 6 PC 1 PC 2 4 Variable X Variable X 1
24 After PCA l 1 = l 2 = Trace = PC 1 displays ( explains ) / = 76.5% of total variance PC PC 1
25 Create a scree plot plots a histogram of the Eigenvalues ordered by magnitude plots the explained variance as a curve possible threshold (explain 75% of data variance) keep top 3 principal components reduce dimensions by a factor of 4/7 = 57%
26 Take a set of faces: each image has 60x60 pixels can write it as a 60x60 D = 3,600 D vector space of images is therefore 360 D each image is a point in that space Perform PCA will yield 3,600 Eigenvectors in 3,600 D space each is a face called Eigenfaces
27 We can reconstruct a face as a linear combination of these Eigenfaces [M. Turk and A. Pentland (1991)] + Average Face Eigenfaces
28 90% variance is captured by the first 50 eigenvectors Reconstruct existing faces using only 50 basis images We can also generate new faces by combining eigenvectors with different weights x V0
29 The axes of the space generated by PCA do not mean much semantically the Eigenvectors are combinations of the actual data dimensions can we use these to determine the most important data dimensions which would be more meaningful? we shall explain it via an example see next slides
30 A More Challenging Example Data from research on habitat definition in the endangered Baw Baw frog 16 environmental and structural variables measured at each of 124 sites Correlation matrix used because variables have different units Philoria frosti
31 Eigenvalues Axis Eigenvalue % of Variance Cumulative % of Variance
32 How Many Axes Are Needed? Does the (k+1) th principal axis represent more variance than would be expected by chance? Several tests and rules have been proposed A common rule of thumb when PCA is based on correlations is that axes with eigenvalues > 1 are worth interpreting In our example 4 Eigenvectors fit this criterion (we shall keep 3 for simplicity)
33 7.0 Baw Baw Frog - PCA of 16 Habitat Variables Eigenvalue PC Axis Number
34 Interpreting Eigenvectors Correlations between variables and the principal axes are known as loadings Each element of the eigenvectors represents the contribution of a given variable to a component The loadings of variables on the first three PCs are shown here PC 1 PC 2 PC 3 Altitude ph Cond TempSurf Relief maxerht averht %ER %VEG %LIT %LOG %W H1Moss DistSWH DistSW DistMF
35 What s a Loading? The amount of weight a data dimension has on a principal component petal length/width have a high loading on PC1 sepal width has a high loading on PC2 PC2 Another observation projection into PC basis can also bring out clusters better since spread is maximized PC1
36 Significance of Variables We can compute the significance of the variables as the sum of squared loadings on to the most significant Eigenvectors we selected (3 in our example) The next slide shows the table of the last slide expanded with these squared loadings We can then sort the table by the squared loadings and make a scree plot The most significant variables are those above some chosen cutoff, for example 0.4 (marked in yellow in the table)
37 Significance of Variables PC 1 PC 2 PC 3 sum of squared loadings Altitude ph Cond TempSurf Relief maxerht averht %ER %VEG %LIT %LOG %W H1Moss DistSWH DistSW DistMF
38 Scree plot Significance of Variables chosen significance threshold variables considered significant more aggressive reduction of variables only eliminate very weak variables
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