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Linear systems resolution
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Related lectures (27)
Linear Algebra Review
Covers the basics of linear algebra, including matrix operations and singular value decomposition.
Linear Systems: Chapters 4, 5, 6
Explores the link between linear systems and optimization through elimination and LU decomposition.
Linear Systems: Diagonal and Triangular Matrices, LU Factorization
Covers linear systems, diagonal and triangular matrices, and LU factorization.
Direct Methods for Linear Systems of Equations
Explores direct methods for solving linear systems of equations, including Gauss elimination and LU decomposition.
Cholesky Factorization: Theory and Algorithm
Explores the Cholesky factorization method for symmetric positive definite matrices.
Matrices and Quadratic Forms: Key Concepts in Linear Algebra
Provides an overview of symmetric matrices, quadratic forms, and their applications in linear algebra and analysis.
Linear Algebra: Singular Value Decomposition
Delves into singular value decomposition and its applications in linear algebra.
Matrix Decomposition: Triangular and Spectral
Covers the decomposition of matrices into triangular blocks and spectral decomposition.
Linear Systems Resolution
Summarizes methods for resolving linear systems, including Gaussian elimination and LU decomposition.
Linear Systems: LU Factorization with Pivoting
Explains the Gaussian elimination algorithm with pivoting and LU factorization for linear systems.
Matrix Multiplication: Applications and Properties
Covers matrix multiplication, properties, and inverses in linear algebra.
Direct Methods for Solving Linear Equations
Explores direct methods for solving linear equations and the impact of errors on solutions and matrix properties.
Singular Value Decomposition: Applications and Interpretation
Explains the construction of U, verification of results, and interpretation of SVD in matrix decomposition.
Eigenvalues and Eigenvectors Decomposition
Covers the decomposition of a matrix into its eigenvalues and eigenvectors, the orthogonality of eigenvectors, and the normalization of vectors.
Linear Systems: Choleski Factorisation
Covers the Choleski factorisation method for solving linear systems efficiently.
Eigenvalues and Optimization: Numerical Analysis Techniques
Discusses eigenvalues, their calculation methods, and their applications in optimization and numerical analysis.
Decomposition LLT: Cholesky
Covers the Cholesky decomposition of a symmetric positive definite matrix and its applications.
Characterization of Invertible Matrices
Explores the properties of invertible matrices, including unique solutions and linear independence.
Singular Value Decomposition: Image Compression and Applications
Covers Singular Value Decomposition, focusing on its application in image compression and data representation.
Linear Algebra: Quadratic Forms and Matrix Diagonalization
Discusses quadratic forms, matrix diagonalization, and their applications in optimization problems.
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