Convergence criteria for Aronszajn's method and for the Bazley-Fox method
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Publication:3790197
DOI10.1017/S030821050002655XzbMath0646.49030MaRDI QIDQ3790197
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Publication date: 1988
Published in: Proceedings of the Royal Society of Edinburgh: Section A Mathematics (Search for Journal in Brave)
convergence criteriaselfadjoint operatorsapproximation of eigenvaluesintermediate problemsAronszajn and the Bazley-Fox methods
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Related Items (2)
Monotone convergence theorems for variational triples with applications to intermediate problems ⋮ Improved Convergence Rates for Intermediate Problems
Cites Work
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- Lower bounds to eigenvalues using operator decompositions of the form \(B*B\)
- Convergence of approximation methods for eigenvalues of completely continuous quadratic forms
- Methods of intermediate problems for eigenvalues. Theory and ramifications
- A canonical decomposition for quadratic forms with applications to monotone convergence theorems
- A convergent variational method of eigenvalue approximation
- Upper and lower bounds for the frequencies of rectangular free plates
- LOWER BOUNDS FOR EIGENVALUES WITH APPLICATION TO THE HELIUM ATOM
- Lower Bounds for Eigenvalues with Application to the Helium Atom
- Convergence theorems for intermediate problems
- Corrigendum: Convergence theorems for intermediate problems
- Monotone continuity of the spectral resolution and the eigenvalues
- Improvement of bounds to eigenvalues of operators of form T*T
- Lower Bounds for Eigenvalues with Displacement of Essential Spectra
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