Lecture 14: Low Rank Changes in A and Its Inverse
Description
In this lecture, Professor Strang introduces the concept of low rank matrices. He demonstrates how using the Sherman-Morrison-Woodbury formula is useful to efficiently compute how small changes in a matrix affect its inverse.
Summary
If \(A\) is changed by a rank-one matrix, so is its inverse.
Woodbury-Morrison formula for those changes
New data in least squares will produce these changes.
Avoid recomputing over again with all data
Note: Formula in class is correct in the textbook.
Related section in textbook: III.1
Instructor: Prof. Gilbert Strang
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| As Taught In: | Spring 2018 |
| Level: | Undergraduate |
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