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Computing the Fréchet Derivative of the Polar Decomposition

Published 16 Aug 2016 in math.NA | (1608.04491v1)

Abstract: We derive iterative methods for computing the Fr\'{e}chet derivative of the map which sends a full-rank matrix $A$ to the factor $U$ in its polar decomposition $A=UH$, where $U$ has orthonormal columns and $H$ is Hermitian positive definite. The methods apply to square matrices as well as rectangular matrices having more rows than columns. Our derivation relies on a novel identity that relates the Fr\'{e}chet derivative of the polar decomposition to the matrix sign function $\mathrm{sign}(X) = X (X2){-1/2}$ applied to a certain block matrix $X$.

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