A theory of numerical approximation for elliptic forms associated with second order differential systems: Application to eigenvalue problems
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Publication:2554601
DOI10.1016/0022-247X(72)90099-6zbMath0243.65053MaRDI QIDQ2554601
Publication date: 1972
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Theoretical approximation in context of PDEs (35A35) Numerical solution of eigenvalue problems involving ordinary differential equations (65L15)
Related Items (8)
A generalized approximation theory for quadratic forms: Application to randomized spline type Sturm-Liouville problems ⋮ New numerical algorithms for eigenvalues and eigenvectors of second order differential equations ⋮ An Approximation Theory for Focal Points and Focal Intervals ⋮ A numerical approximation theory for second-order integral differential equations ⋮ Elliptic quadratic forms, focal points, and a generalized theory of oscillation ⋮ Numerical focal point and focal interval problems ⋮ An Approximation Theory for Generalized Fredholm Quadratic Forms and Integral-Differential Equations ⋮ A new definition of oscillation; application to control and abnormal second order differential equations
Cites Work
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- An approximation theory for elliptic quadratic forms on Hilbert spaces: Application to the eigenvalue problem for compact quadratic forms
- Applications of the theory of quadratic forms in Hilbert space to the calculus of variations
- A Theory of Focal Points and Focal Intervals for an Elliptic Quadratic Form on a Hilbert Space
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