Intro to Data Science

Intro to Data Science

Steve Brunton via YouTube Direct link

Fourier Series: Part 2

65 of 127

65 of 127

Fourier Series: Part 2

Class Central Classrooms beta

YouTube videos curated by Class Central.

Classroom Contents

Intro to Data Science

Automatically move to the next video in the Classroom when playback concludes

  1. 1 Intro to Data Science: Overview
  2. 2 Intro to Data Science: Historical Context
  3. 3 Intro to Data Science: What is Data Science?
  4. 4 Intro to Data Science: Answering Questions with Data
  5. 5 Intro to Data Science: The Nature of Data
  6. 6 Machine Learning Overview
  7. 7 Machine Learning Goals
  8. 8 Machine Learning and Cross-Validation
  9. 9 Types of Machine Learning 1
  10. 10 Types of Machine Learning 2
  11. 11 Artificial Intelligence
  12. 12 Neural Network Overview
  13. 13 Neural Network Architectures & Deep Learning
  14. 14 Neural Networks and Deep Learning
  15. 15 Neural Networks: Caveats
  16. 16 Digital Twins
  17. 17 Data Visualization: Overview
  18. 18 Data Visualization: Types of Data
  19. 19 Data Visualization: Storytelling with Data
  20. 20 Data Visualization: Buyer Beware
  21. 21 Singular Value Decomposition (SVD): Overview
  22. 22 Singular Value Decomposition (SVD): Mathematical Overview
  23. 23 Singular Value Decomposition (SVD): Matrix Approximation
  24. 24 Singular Value Decomposition (SVD): Dominant Correlations
  25. 25 SVD Method of Snapshots
  26. 26 Matrix Completion and the Netflix Prize
  27. 27 Unitary Transformations
  28. 28 Linear Systems of Equations, Least Squares Regression, Pseudoinverse
  29. 29 Least Squares Regression and the SVD
  30. 30 Linear Systems of Equations
  31. 31 Linear Regression
  32. 32 Principal Component Analysis (PCA)
  33. 33 SVD and Optimal Truncation
  34. 34 SVD: Image Compression [Matlab]
  35. 35 SVD: Image Compression [Python]
  36. 36 Unitary Transformations and the SVD [Matlab]
  37. 37 Unitary Transformations and the SVD [Python]
  38. 38 Linear Regression 1 [Matlab]
  39. 39 Linear Regression 2 [Matlab]
  40. 40 Linear Regression 1 [Python]
  41. 41 Linear Regression 2 [Python]
  42. 42 Linear Regression 3 [Python]
  43. 43 SVD and Alignment: A Cautionary Tale
  44. 44 Principal Component Analysis (PCA) [Matlab]
  45. 45 Principal Component Analysis (PCA) 1 [Python]
  46. 46 Principal Component Analysis (PCA) 2 [Python]
  47. 47 SVD: Eigenfaces 1 [Matlab]
  48. 48 SVD: Eigenfaces 2 [Matlab]
  49. 49 SVD: Eigenfaces 3 [Matlab]
  50. 50 SVD: Eigenfaces 4 [Matlab]
  51. 51 SVD: Eigen Action Heros [Matlab]
  52. 52 SVD: Eigenfaces 3 [Python]
  53. 53 SVD: Eigenfaces 2 [Python]
  54. 54 SVD: Eigenfaces 1 [Python]
  55. 55 SVD: Optimal Truncation [Matlab]
  56. 56 SVD: Optimal Truncation [Python]
  57. 57 SVD: Importance of Alignment [Python]
  58. 58 SVD: Importance of Alignment [Matlab]
  59. 59 Randomized SVD Code [Matlab]
  60. 60 Randomized SVD Code [Python]
  61. 61 Randomized Singular Value Decomposition (SVD)
  62. 62 Randomized SVD: Power Iterations and Oversampling
  63. 63 Fourier Analysis: Overview
  64. 64 Fourier Series: Part 1
  65. 65 Fourier Series: Part 2
  66. 66 Inner Products in Hilbert Space
  67. 67 Complex Fourier Series
  68. 68 Fourier Series [Matlab]
  69. 69 Fourier Series [Python]
  70. 70 Fourier Series and Gibbs Phenomena [Matlab]
  71. 71 Fourier Series and Gibbs Phenomena [Python]
  72. 72 The Fourier Transform
  73. 73 The Fourier Transform and Derivatives
  74. 74 The Fourier Transform and Convolution Integrals
  75. 75 Parseval's Theorem
  76. 76 Solving the Heat Equation with the Fourier Transform
  77. 77 The Discrete Fourier Transform (DFT)
  78. 78 Computing the DFT Matrix
  79. 79 The Fast Fourier Transform (FFT)
  80. 80 The Fast Fourier Transform Algorithm
  81. 81 Denoising Data with FFT [Matlab]
  82. 82 Denoising Data with FFT [Python]
  83. 83 Computing Derivatives with FFT [Matlab]
  84. 84 Computing Derivatives with FFT [Python]
  85. 85 Solving PDEs with the FFT [Matlab]
  86. 86 Solving PDEs with the FFT [Python]
  87. 87 Why images are compressible: The Vastness of Image Space
  88. 88 What is Sparsity?
  89. 89 Sparsity and Parsimonious Models: Everything should be made as simple as possible, but no simpler
  90. 90 Compressed Sensing: Overview
  91. 91 Compressed Sensing: Mathematical Formulation
  92. 92 Compressed Sensing: When It Works
  93. 93 Sparsity and the L1 Norm
  94. 94 Solving PDEs with the FFT, Part 2 [Matlab]
  95. 95 Solving PDEs with the FFT, Part 2 [Python]
  96. 96 The Spectrogram and the Gabor Transform
  97. 97 Spectrogram Examples [Matlab]
  98. 98 Spectrogram Examples [Python]
  99. 99 Uncertainty Principles and the Fourier Transform
  100. 100 Wavelets and Multiresolution Analysis
  101. 101 Image Compression and the FFT
  102. 102 Sparse Sensor Placement Optimization for Reconstruction
  103. 103 Sparse Sensor Placement Optimization for Classification
  104. 104 Sparse Representation (for classification) with examples!
  105. 105 Image Compression with Wavelets (Examples in Python)
  106. 106 Image Compression with the FFT (Examples in Matlab)
  107. 107 Image Compression and Wavelets (Examples in Matlab)
  108. 108 Image Compression and the FFT (Examples in Python)
  109. 109 Beating Nyquist with Compressed Sensing, part 2
  110. 110 Underdetermined systems and compressed sensing [Matlab]
  111. 111 Underdetermined systems and compressed sensing [Python]
  112. 112 Beating Nyquist with Compressed Sensing
  113. 113 Robust Regression with the L1 Norm
  114. 114 Robust Regression with the L1 Norm [Matlab]
  115. 115 Robust Regression with the L1 Norm [Python]
  116. 116 Exponential Growth: Overview
  117. 117 Examples of Exponential Growth
  118. 118 Exponential Growth and Euler
  119. 119 Exponential Growth is a Lie
  120. 120 Machine Learning for Fluid Dynamics: Patterns
  121. 121 Machine Learning for Fluid Dynamics: Models and Control
  122. 122 The Anatomy of a Dynamical System
  123. 123 Beating Nyquist with Compressed Sensing, in Python
  124. 124 The Laplace Transform: A Generalized Fourier Transform
  125. 125 Laplace Transforms and Differential Equations
  126. 126 Laplace Transform Examples
  127. 127 Sparsity and Compression: An Overview

Never Stop Learning.

Get personalized course recommendations, track subjects and courses with reminders, and more.

Someone learning on their laptop while sitting on the floor.