Decay rates for inverses of band matrices

Demko, Stephen; Moss, William F.; Smith, Philip W.

doi:10.1090/s0025-5718-1984-0758197-9

Cited by 304 publications

(119 citation statements)

References 13 publications

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“…The next theorem is a Lieb-Robinson bound for such finite range Hamiltonians, similar to those proven for many-body Hamiltonians [8][9][10][11]. This result is also similar to results on the decay of entries of smooth functions of matrices proven in [12,13].…”

Section: Reduction To Block Tridiagonal Problemsupporting

confidence: 81%

Making Almost Commuting Matrices Commute

Hastings

2009

Commun. Math. Phys.

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Suppose two Hermitian matrices A, B almost commute ( [A, B] ≤ δ). Are they close to a commuting pair of Hermitian matrices, A , B , with A − A , B − B ≤ ? A theorem of H. Lin [3] shows that this is uniformly true, in that for every > 0 there exists a δ > 0, independent of the size N of the matrices, for which almost commuting implies being close to a commuting pair. However, this theorem does not specify how δ depends on . We give uniform bounds relating δ and . We provide tighter bounds in the case of block tridiagonal and tridiagonal matrices and a fully constructive method in that case. Within the context of quantum measurement, this implies an algorithm to construct a basis in which we can make a projective measurement that approximately measures two approximately commuting operators simultaneously. Finally, we comment briefly on the case of approximately measuring three or more approximately commuting operators using POVMs (positive operator-valued measures) instead of projective measurements.

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Section: Reduction To Block Tridiagonal Problemsupporting

confidence: 81%

Making Almost Commuting Matrices Commute

Hastings

2009

Commun. Math. Phys.

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“…A possible exception is the case where A is a banded symmetric positive definite (SPD) matrix. In this case, the entries of A −1 are bounded in an exponentially decaying manner along each row or column; see [36]. Specifically, there exist 0 < ρ < 1 and a constant C such that for all i, j…”

Section: Methods Based On Frobenius Norm Minimizationmentioning

confidence: 99%

A comparative study of sparse approximate inverse preconditioners

Benzi

Tůma

1999

Applied Numerical Mathematics

223

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A number of recently proposed preconditioning techniques based on sparse approximate inverses are considered. A description of the preconditioners is given, and the results of an experimental comparison performed on one processor of a Cray C98 vector computer using sparse matrices from a variety of applications are presented. A comparison with more standard preconditioning techniques, such as incomplete factorizations, is also included. Robustness, convergence rates, and implementation issues are discussed.

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“…Assume that A is an infinite matrix that is bounded on 2 satisfies |b kl | = O(e −β|k−l| ) for some β, 0 < β < α. See [12,24,30] for a few versions of this statement.…”

Section: Introductionmentioning

confidence: 99%

“…Both types of results are highly relevant and have numerous applications in numerical analysis [9,12,33,35], wavelet theory [24], time-frequency analysis [5,17], and sampling theory [1,19], to mention just a few non-trivial applications.…”

Section: Introductionmentioning

confidence: 99%