AbstractOur randomized preprocessing enables pivoting-free and orthogonalization-free solution of homogeneous linear systems of equations. In the case of Toeplitz inputs, we decrease the estimated solution time from quadratic to nearly linear, and our tests show dramatic decrease of the CPU time as well. We prove numerical stability of our approach and extend it to solving nonsingular linear systems, inversion and generalized (Moore–Penrose) inversion of general and structured matrices by means of Newton’s iteration, approximation of a matrix by a nearby matrix that has a smaller rank or a smaller displacement rank, matrix eigen-solving, and root-finding for polynomial and secular equations and for polynomial systems of equations. Some by-p...
AbstractWe propose a new direct method to solve linear systems. This method is based on the Sherman–...
AbstractA fast numerical algorithm for solving systems of linear equations with tridiagonal block To...
We present the first accelerated randomized algorithm for solving linear systems in Euclidean spaces...
AbstractOur randomized preprocessing enables pivoting-free and orthogonalization-free solution of ho...
AbstractSolution of homogeneous linear systems of equations is a basic operation of matrix computati...
Solution of homogeneous linear systems of equations is a basic operation of matrix computa-tions. Th...
Our randomized preprocessing of a matrix by means of augmentation counters its degeneracy and ill co...
Effective preconditioners are known for some important but special classes of matrices. In contrast ...
Seeking a basis for the null space of a rectangular and possibly rank deficient and ill con-ditioned...
By combining our weakly randomized preconditioning with aggrega-tion and other known and novel techn...
Seeking a basis for the null space of a rectangular and possibly rank deficient and ill condi-tioned...
AbstractSeeking a basis for the null space of a rectangular and possibly rank deficient and ill cond...
We apply a new parametrized version of Newton's iteration in order to compute (over any field F of c...
With a high probablilty our randomized augmentation of a matrix eliminates its rank defi-ciency and ...
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizin...
AbstractWe propose a new direct method to solve linear systems. This method is based on the Sherman–...
AbstractA fast numerical algorithm for solving systems of linear equations with tridiagonal block To...
We present the first accelerated randomized algorithm for solving linear systems in Euclidean spaces...
AbstractOur randomized preprocessing enables pivoting-free and orthogonalization-free solution of ho...
AbstractSolution of homogeneous linear systems of equations is a basic operation of matrix computati...
Solution of homogeneous linear systems of equations is a basic operation of matrix computa-tions. Th...
Our randomized preprocessing of a matrix by means of augmentation counters its degeneracy and ill co...
Effective preconditioners are known for some important but special classes of matrices. In contrast ...
Seeking a basis for the null space of a rectangular and possibly rank deficient and ill con-ditioned...
By combining our weakly randomized preconditioning with aggrega-tion and other known and novel techn...
Seeking a basis for the null space of a rectangular and possibly rank deficient and ill condi-tioned...
AbstractSeeking a basis for the null space of a rectangular and possibly rank deficient and ill cond...
We apply a new parametrized version of Newton's iteration in order to compute (over any field F of c...
With a high probablilty our randomized augmentation of a matrix eliminates its rank defi-ciency and ...
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizin...
AbstractWe propose a new direct method to solve linear systems. This method is based on the Sherman–...
AbstractA fast numerical algorithm for solving systems of linear equations with tridiagonal block To...
We present the first accelerated randomized algorithm for solving linear systems in Euclidean spaces...