Lecture 16: Derivatives of Inverse and Singular Values
Description
In this lecture, Professor Strang reviews how to find the derivatives of inverse and singular values. Later in the lecture, he discusses LASSO optimization, the nuclear norm, matrix completion, and compressed sensing.
Summary
Derivative of \(A^2\) is \(A(dA/dt)+(dA/dt)A\): NOT \(2A(dA/dt)\).
The inverse of \(A\) has derivative \(-A^{-1}(dA/dt)A^{-1}\).
Derivative of singular values \(= u(dA/dt)v^{\mathtt{T}} \)
Interlacing of eigenvalues / Weyl inequalities
Related section in textbook: III.1-2
Instructor: Prof. Gilbert Strang
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| As Taught In: | Spring 2018 |
| Level: | Undergraduate |
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