AbstractA new bound for the condition number of the matrix exponential is presented. Using the bound, we propose an efficient approximation to the condition number, denoted by κg(s, X), that avoids the computation of the Fréchet derivative of the matrix exponential that underlies condition number estimation in the existing algorithms. We exploit the identity eX=(eX/2s)2s for a nonnegative integer s with the properties of the Fréchet derivative operator to obtain the bound. Our cost analysis reveals that considerable computational savings are possible since estimating the condition number by the existing algorithms requires several invocation of the Fréchet derivative of the matrix exponential whose single invocation costs as twice as the co...
The matrix exponential plays a fundamental role in linear differential equations arising in enginee...
The scaling and squaring method for the matrix exponential is based on the approximation $e^A \appro...
The most popular algorithms for computing the matrix exponential are those based on the scaling and ...
AbstractA new bound for the condition number of the matrix exponential is presented. Using the bound...
A new bound for the condition number of the matrix exponential is presented. Using the bound, we pro...
A new bound for the condition number of the matrix exponential is presented. Using the bound, we pro...
A new bound for the condition number of the matrix exponential is presented. Using the bound, we pro...
The matrix exponential is a much-studied matrix function having many applications. The Fr\'echet der...
New algorithms for the matrix exponential and its Fr\'echet derivative are presented. First, we der...
We design a block Krylov method to compute the action of the Fréchet derivative of a matrix function...
The most popular method for computing the matrix logarithm is the inverse scaling and squaring metho...
This work presents a new algorithm for matrix exponential computation that significantly simplifies ...
Matrix functions in general are an interesting area in matrix analysis and are used in many areas of...
[EN] This work gives a new formula for the forward relative error of matrix exponential Taylor appr...
[EN] This paper presents new Taylor algorithms for the computation of the matrix exponential based o...
The matrix exponential plays a fundamental role in linear differential equations arising in enginee...
The scaling and squaring method for the matrix exponential is based on the approximation $e^A \appro...
The most popular algorithms for computing the matrix exponential are those based on the scaling and ...
AbstractA new bound for the condition number of the matrix exponential is presented. Using the bound...
A new bound for the condition number of the matrix exponential is presented. Using the bound, we pro...
A new bound for the condition number of the matrix exponential is presented. Using the bound, we pro...
A new bound for the condition number of the matrix exponential is presented. Using the bound, we pro...
The matrix exponential is a much-studied matrix function having many applications. The Fr\'echet der...
New algorithms for the matrix exponential and its Fr\'echet derivative are presented. First, we der...
We design a block Krylov method to compute the action of the Fréchet derivative of a matrix function...
The most popular method for computing the matrix logarithm is the inverse scaling and squaring metho...
This work presents a new algorithm for matrix exponential computation that significantly simplifies ...
Matrix functions in general are an interesting area in matrix analysis and are used in many areas of...
[EN] This work gives a new formula for the forward relative error of matrix exponential Taylor appr...
[EN] This paper presents new Taylor algorithms for the computation of the matrix exponential based o...
The matrix exponential plays a fundamental role in linear differential equations arising in enginee...
The scaling and squaring method for the matrix exponential is based on the approximation $e^A \appro...
The most popular algorithms for computing the matrix exponential are those based on the scaling and ...