Orthogonal Projections and Applications in Linear Algebra (UMAP)
Author: Yves Nievergelt
This module demonstrates how real applications require orthogonal projections in abstract linear spaces. The material presented here may serve either as a complement within a first course in linear algebra or as a review in a subsequent course, for instance, in computer graphics, numerical analysis, or Fourier analysis.
Table of Contents:
INTRODUCTION
APPLICATIONS OF ORTHOGONAL PROJECTIONS
Application to Three-Dimensional Computer Graphics
Application to Ordinary Least-Squares Regression
Application to the Computation of Functions
Application to Fourier Series and Transforms
SUMMARY OF DEFINITIONS AND THEOREMS
Number Fields
Linear Spaces
Inner Products and Inequalities
Gram-Schmidt Orthogonalization
SUMMARY OF ORTHOGONAL PROJECTIONS
CONCLUSION
SOLUTIONS TO THE EXERCISES
REFERENCES
ABOUT THE AUTHOR
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