A new algorithm is derived for computing the actions $f(tA)B$ and $f(tA^{1/2})B$, where $f$ is cosine, sinc, sine, hyperbolic cosine, hyperbolic sinc, or hyperbolic sine function. $A$ is an $n\times n$ matrix and $B$ is $n\times n_0$ with $n_0 \ll n$. $A^{1/2}$ denotes any matrix square root of $A$ and it is never required to be computed. The algorithm offers six independent output options given $t$, $A$, $B$, and a tolerance. For each option, actions of a pair of trigonometric or hyperbolic matrix functions are simultaneously computed. The algorithm scales the matrix $A$ down by a positive integer $s$, approximates $f(s^{-1}tA)B$ by a truncated Taylor series, and finally uses the recurrences of the Chebyshev polynomials of the first and se...
Several improvements are made to an algorithm of Higham and Smith for computing the matrix cosine. T...
This paper presents three different alternatives to evaluate the matrix hyperbolic cosine using Bern...
Existing algorithms for computing the matrix cosine are tightly coupled to a specific precision of f...
We derive a new algorithm for computing the action $f(A)V$ of the cosine, sine, hyperbolic cosine, a...
Numerical algorithms are considered for three distinct areas of numerical linear algebra: hyperbolic...
[EN] A new procedure is presented for computing the matrix cosine and sine simultaneously by means o...
Abstract. Several existing algorithms for computing the matrix cosine employ polynomial or rational ...
Abstract. Several existing algorithms for computing the matrix cosine employ polynomial or rational ...
Several existing algorithms for computing the matrix cosine employ polynomial or rational approximat...
Theoretical and computational aspects of matrix inverse trigonometric and inverse hyperbolic functio...
The need to evaluate a function $f(A)\in\mathbb{C}^{n \times n}$ of a matrix $A\in\mathbb{C}^{n \tim...
A new algorithm is developed for computing $e^{tA}B$, where $A$ is an $n\times n$ matrix and $B$ is ...
A new algorithm is developed for computing $e^{tA}B$, where $A$ is an $n\times n$ matrix and $B$ is ...
Theoretical aspects of periodic functions of matrices and issues arising from the multivalued nature...
Several improvements are made to an algorithm of Higham and Smith for com-puting the matrix cosine. ...
Several improvements are made to an algorithm of Higham and Smith for computing the matrix cosine. T...
This paper presents three different alternatives to evaluate the matrix hyperbolic cosine using Bern...
Existing algorithms for computing the matrix cosine are tightly coupled to a specific precision of f...
We derive a new algorithm for computing the action $f(A)V$ of the cosine, sine, hyperbolic cosine, a...
Numerical algorithms are considered for three distinct areas of numerical linear algebra: hyperbolic...
[EN] A new procedure is presented for computing the matrix cosine and sine simultaneously by means o...
Abstract. Several existing algorithms for computing the matrix cosine employ polynomial or rational ...
Abstract. Several existing algorithms for computing the matrix cosine employ polynomial or rational ...
Several existing algorithms for computing the matrix cosine employ polynomial or rational approximat...
Theoretical and computational aspects of matrix inverse trigonometric and inverse hyperbolic functio...
The need to evaluate a function $f(A)\in\mathbb{C}^{n \times n}$ of a matrix $A\in\mathbb{C}^{n \tim...
A new algorithm is developed for computing $e^{tA}B$, where $A$ is an $n\times n$ matrix and $B$ is ...
A new algorithm is developed for computing $e^{tA}B$, where $A$ is an $n\times n$ matrix and $B$ is ...
Theoretical aspects of periodic functions of matrices and issues arising from the multivalued nature...
Several improvements are made to an algorithm of Higham and Smith for com-puting the matrix cosine. ...
Several improvements are made to an algorithm of Higham and Smith for computing the matrix cosine. T...
This paper presents three different alternatives to evaluate the matrix hyperbolic cosine using Bern...
Existing algorithms for computing the matrix cosine are tightly coupled to a specific precision of f...