It is shown that the problem of balancing a nonnegative matrix by positive diagonal matrices can be recast as a nonlinear eigenvalue problem with eigenvector nonlinearity. Based on this equivalent formulation some adaptations of the power method and Arnoldi process are proposed for computing the dominant eigenvector which defines the structure of the diagonal transformations. Numerical results illustrate that our novel methods accelerate significantly the convergence of the customary Sinkhorn-Knopp iteration for matrix balancing in the case of clustered dominant eigenvalues
Nella tesi e' presentato il metodo di Krylov razionale per la risoluzione di problemi agli autovalor...
summary:In recent papers Ruhe suggested a rational Krylov method for nonlinear eigenproblems knittin...
The Arnoldi method for standard eigenvalue problems possesses several attractive properties making i...
It is shown that the problem of balancing a nonnegative matrix by positive diagonal matrices can be ...
As long as a square nonnegative matrix A contains sufficient nonzero elements, then the matrix can b...
As long as a square nonnegative matrix $A$ contains sufficient nonzero elements, the Sinkhorn-Knopp...
Abstract. As long as a square nonnegative matrix A contains sufficient nonzero elements, then the ma...
The Arnoldi iteration is widely used to compute a few eigenvalues of a large sparse or structured ma...
As long as a square nonnegative matrix A contains sufficient nonzero elements, then the Sinkhorn-Kno...
AbstractWe prove that Sinkhorn balancing always converges linearly, provided the starting matrix has...
The partial Schur factorization can be used to represent several eigenpairs of a matrix in a numeric...
Sorensen's iteratively restarted Arnoldi algorithm is one of the most successful and flexible method...
We consider the nonlinear eigenvalue problem: M (λ)x = 0, where M (λ) is a large parameter-dependent...
The Arnoldi algorithm, or iteration, is a computationally attractive technique for computing a few e...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
Nella tesi e' presentato il metodo di Krylov razionale per la risoluzione di problemi agli autovalor...
summary:In recent papers Ruhe suggested a rational Krylov method for nonlinear eigenproblems knittin...
The Arnoldi method for standard eigenvalue problems possesses several attractive properties making i...
It is shown that the problem of balancing a nonnegative matrix by positive diagonal matrices can be ...
As long as a square nonnegative matrix A contains sufficient nonzero elements, then the matrix can b...
As long as a square nonnegative matrix $A$ contains sufficient nonzero elements, the Sinkhorn-Knopp...
Abstract. As long as a square nonnegative matrix A contains sufficient nonzero elements, then the ma...
The Arnoldi iteration is widely used to compute a few eigenvalues of a large sparse or structured ma...
As long as a square nonnegative matrix A contains sufficient nonzero elements, then the Sinkhorn-Kno...
AbstractWe prove that Sinkhorn balancing always converges linearly, provided the starting matrix has...
The partial Schur factorization can be used to represent several eigenpairs of a matrix in a numeric...
Sorensen's iteratively restarted Arnoldi algorithm is one of the most successful and flexible method...
We consider the nonlinear eigenvalue problem: M (λ)x = 0, where M (λ) is a large parameter-dependent...
The Arnoldi algorithm, or iteration, is a computationally attractive technique for computing a few e...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
Nella tesi e' presentato il metodo di Krylov razionale per la risoluzione di problemi agli autovalor...
summary:In recent papers Ruhe suggested a rational Krylov method for nonlinear eigenproblems knittin...
The Arnoldi method for standard eigenvalue problems possesses several attractive properties making i...