DOIAbstract
The numerical solution of an algebraic Riccati equation can be reduced to the computation of an invariant subspace of a suitable matrix or a deflating subspace of a suitable pencil
The numerical solution of an algebraic Riccati equation can be reduced to the computation of an invariant subspace of a suitable matrix or a deflating subspace of a suitable pencil
AbstractThe algebraic Riccati equation can be solved by finding a certain invariant subspace of a re...
We consider the numerical solution of the continuous algebraic Riccati equation A*X\u2009+\u2009XA\u...
This paper deals with two interrelated issues. One is an invariant subspace approach to finding sol...
The numerical solution of an algebraic Riccati equation can be reduced to the computation of an inva...
This paper addresses some numerical issues that arise in computing a basis for the stable invariant ...
This paper addresses some numerical issues that arise in computing a basis for the stable invariant ...
AbstractWe present new algorithms for the numerical approximation of eigenvalues and invariant subsp...
A new backward stable, structure preserving method of complexity O(n^3) is presented for computing t...
A new backward stable, structure preserving method of complexity O(n^3) is presented for computing t...
This chapter provides a survey of the classical algorithms for the numerical solution of algebraic R...
This chapter provides a survey of the classical algorithms for the numerical solution of algebraic R...
AbstractA new backward stable, structure preserving method of complexity O(n3) is presented for comp...
A numerically stable algorithm is derived to compute orthonormal bases for any deflating subspace of...
This chapter provides a survey of the main theoretical properties concerning algebraic Riccati equat...
This chapter provides a survey of the main theoretical properties concerning algebraic Riccati equat...
AbstractThe algebraic Riccati equation can be solved by finding a certain invariant subspace of a re...
We consider the numerical solution of the continuous algebraic Riccati equation A*X\u2009+\u2009XA\u...
This paper deals with two interrelated issues. One is an invariant subspace approach to finding sol...
The numerical solution of an algebraic Riccati equation can be reduced to the computation of an inva...
This paper addresses some numerical issues that arise in computing a basis for the stable invariant ...
This paper addresses some numerical issues that arise in computing a basis for the stable invariant ...
AbstractWe present new algorithms for the numerical approximation of eigenvalues and invariant subsp...
A new backward stable, structure preserving method of complexity O(n^3) is presented for computing t...
A new backward stable, structure preserving method of complexity O(n^3) is presented for computing t...
This chapter provides a survey of the classical algorithms for the numerical solution of algebraic R...
This chapter provides a survey of the classical algorithms for the numerical solution of algebraic R...
AbstractA new backward stable, structure preserving method of complexity O(n3) is presented for comp...
A numerically stable algorithm is derived to compute orthonormal bases for any deflating subspace of...
This chapter provides a survey of the main theoretical properties concerning algebraic Riccati equat...
This chapter provides a survey of the main theoretical properties concerning algebraic Riccati equat...
AbstractThe algebraic Riccati equation can be solved by finding a certain invariant subspace of a re...
We consider the numerical solution of the continuous algebraic Riccati equation A*X\u2009+\u2009XA\u...
This paper deals with two interrelated issues. One is an invariant subspace approach to finding sol...
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