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Lecture 8 Matrix Inverse and LU Decomposition

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Presentation on theme: "Lecture 8 Matrix Inverse and LU Decomposition"— Presentation transcript:

1 Lecture 8 Matrix Inverse and LU Decomposition
Shang-Hua Teng

2 Inverse Matrices In high dimensions

3 Uniqueness of Inverse Matrices

4 Inverse and Linear System

5 Inverse and Linear System
Therefore, the inverse of A exists if and only if elimination produces n non-zero pivots (row exchanges allowed)

6 Inverse, Singular Matrix and Degeneracy
Suppose there is a nonzero vector x such that Ax = 0 [column vectors of A co-linear] then A cannot have an inverse Contradiction: So if A is invertible, then Ax =0 can only have the zero solution x=0

7 One More Property Proof So

8 Gauss-Jordan Elimination for Computing A-1

9 Gauss-Jordan Elimination for Computing A-1

10 Gauss-Jordan Elimination for Computing A-1
3D: Solving three linear equations defined by A simultaneously n dimensions: Solving n linear equations defined by A simultaneously

11 Example:Gauss-Jordan Elimination for Computing A-1
Make a Big Augmented Matrix

12 Example:Gauss-Jordan Elimination for Computing A-1

13 Example:Gauss-Jordan Elimination for Computing A-1

14 Example:Gauss-Jordan Elimination for Computing A-1

15 Elimination = Factorization A = LU

16 Elimination = Factorization A = LU
What is the inverse of the left triangle? Call the upper triangular matrix U

17 What is the Inverse of Eij

18 Product with Elimination Matrices

19 Inverse of Triangular Matrix
Call this matrix L

20 Matrix L L is a lower triangular matrix with 1’s on the diagonal and the non-zeros entries are exactly the multipliers lij

21 If the elimination needs no row exchange
LU Factorization And …. A = LU If the elimination needs no row exchange

22 Two Step Method 1. Factor A = LU by elimination possible with row permutation 2. Solve Lc = b (by forward substitution), then Ux = c (by backward substitution). Complexity: step 1 (multiplications & subtractions) Step 2: O(n2)

23 Row Exchange and Permutation Matrix
Define i We have:

24 Row Exchange and Permutation Matrix
So:

25 Row Exchange and Permutation Matrix
To Permute, we just need to assemble a matrix of ei properly For example, to move row 1 to row 3, row 2 to row 1, and row 3 to row 2, we can use

26 Need to Permute Rows In Elimination
0 pivot Permute row 2 with row 3 we have

27 LU Factorization Theorem
For any matrix A, there exists a permutation P, such that PA = LU Can be obtained by elimination with potential row exchange

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