A Taylor expansion of the square root matrix function
DOI10.1016/j.jmaa.2018.05.005zbMath1401.15009arXiv1705.08561OpenAlexW2963813650MaRDI QIDQ1635587
Pierre Del Moral, Angèle Niclas
Publication date: 31 May 2018
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1705.08561
Fréchet derivativeTaylor expansionSylvester equationmatrix exponentialspectral and Frobenius normssquare root matrices
Derivatives of functions in infinite-dimensional spaces (46G05) Matrix exponential and similar functions of matrices (15A16) Numerical computation of matrix exponential and similar matrix functions (65F60)
Related Items (12)
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- A fresh variational-analysis look at the positive semidefinite matrices world
- Computing real square roots of a real matrix
- The complex step approximation to the Fréchet derivative of a matrix function
- The operator equation \(\sum _{i=0}^n A^{n-i}XB^i=Y\)
- An inequality for trace ideals
- Perturbation bounds for matrix square roots and Pythagorean sums
- Stable iterations for the matrix square root
- Evaluating the Fréchet derivative of the matrix \(p\)th root
- On the m-th roots of a complex matrix
- Computing the Fréchet Derivative of the Matrix Logarithm and Estimating the Condition Number
- Higher Order Fréchet Derivatives of Matrix Functions and the Level-2 Condition Number
- Concrete Functional Calculus
- A Schur–Padé Algorithm for Fractional Powers of a Matrix
- Computational Methods for Linear Matrix Equations
- Computing the Fréchet Derivative of the Matrix Exponential, with an Application to Condition Number Estimation
- A Schur-Parlett Algorithm for Computing Matrix Functions
- The Matrix Square Root from a New Functional Perspective: Theoretical Results and Computational Issues
- Finite Dimensional Linear Systems
- Functions of Matrices
This page was built for publication: A Taylor expansion of the square root matrix function
