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A Variational Approach to Multiparameter Eigenvalue Problems for Matrices
SIAM Journal on Mathematical Analysis, 1977The variational theory of eigenvalues and eigenvectors is extended to the multiparameter problem $(T_r + \sum_{s = 1}^k {\lambda _s V_{rs} } )x_r = 0$, $r = 1, \cdots ,k$ where $T_r $ and $V_{rs} $...
Binding, Paul, Browne, Patrick J.
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Eigenvalue problem in multiparameter optimization problems of theoretical physics
Cybernetics and Systems Analysis, 1995The paper concerns the solving of singular spectral problems for second order differential equations and systems of differential equations with coupled parameters. Numerical results are presented.
Bublik, B. N., Lyashenko, B. N.
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On regularization in multiparameter eigenvalue problems
Differential Equations, 2011zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Non-standard oscillation theory for multiparameter eigenvalue problems
Proceedings of the Royal Society of Edinburgh: Section A Mathematics, 2012An eigenvalue problem for k Sturm–Liouville equations coupled by k parameters λ1,…,λk is considered. In contrast to the standard case, for each r, the second-order derivative in the rth equation is multiplied by λr. This problem presents various interesting features.
P. A. Binding, H. Volkmer
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Bifurcation from eigenvalues in nonlinear multiparameter problems
Nonlinear Analysis: Theory, Methods & Applications, 1990Let \(\Lambda\) be a parameter (Banach) space, \(X_ 1,...,X_ m\), \(Y_ 1,...,Y_ m\) Banach spaces, \(L_ r: \Lambda \to {\mathcal L}(X_ r,Y_ r)\) and \(N_ r: \Lambda \times (X_ 1+X_ 2+...+X_ m)\to Y_ r\) \(C^ k\)-functions. The author studies the structure of the set of nontrivial solutions of the system \[ L_ r(\lambda)x_ r+N_ r(\lambda;x_ 1,...,x_ m ...
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10.—An Abstract Relation for Multiparameter Eigenvalue Problems
Proceedings of the Royal Society of Edinburgh: Section A Mathematics, 1976SynopsisConsider the multiparameter systemwhere ut is an element of a separable Hilbert space Hi, i = 1, …, n. The operators Sij are assumed to be bounded symmetric operators in Hi and Ai is assumed self-adjoint. In addition consider the operator equationwhere B is densely defined and closed in a separable Hilbert space H and Tj, j = 1, …, n is a ...
A. Källström, B. D. Sleeman
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DYNAMIC MODEL UPDATING—A MULTIPARAMETER EIGENVALUE PROBLEM
Mechanical Systems and Signal Processing, 2001Abstract Analytical models of linear elastomechanical systems are often updated by model parameter estimation using input–output measurements or modal test results. The structure of the model equations and the parametrisation of the spatially discretised model—often a sum of matrices multiplied each by a dimensionless adjustment parameter—are usually
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Aeroelastic flutter as a multiparameter eigenvalue problem
2015In this thesis we explore the relationship between aeroelastic flutter and multiparameter spectral theory. We first introduce the basic concept of the relationship between these two fields in abstract terms. Then we expand on this initial concept, using it to devise visualisation methods and a wide variety of solvers for flutter problems.
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Local bifurcation theory for multiparameter nonlinear eigenvalue problems
Nonlinear Analysis: Theory, Methods & Applications, 2002The multiparameter bifurcation problem for \(\lambda=(\lambda_1,\cdots,\lambda_p)\in \mathbb R^p\) given by \[ F(\lambda,x)\equiv Bx-\sum_{i=1}^{p} \lambda_i Ax+N(\lambda,x)=0, \quad N(\lambda,0)=0, \quad D_x N(\lambda,0)=0, \] is considered in real Banach spaces \(X,Y\). In the case that \(\dim N(D_xF(\lambda^0,0))=n\geq 1\) and \(\text{codim}\,R(D_xF(
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ANALYTIC PERTURBATIONS OF MULTIPARAMETER EIGENVALUE PROBLEMS
The Quarterly Journal of Mathematics, 1979Browne, Patrick J., Sleeman, B. D.
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