Computing all Pairs (λ,μ) Such That λ is a Double Eigenvalue of A+μB
From MaRDI portal
Publication:3112399
DOI10.1137/100783157zbMath1245.65043OpenAlexW241941236MaRDI QIDQ3112399
Elias Jarlebring, Simen Kvaal, Wim Michiels
Publication date: 16 January 2012
Published in: SIAM Journal on Matrix Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/100783157
Related Items (9)
Analysis technique for exceptional points in open quantum systems and QPT analogy for the appearance of irreversibility ⋮ Constrained ellipse fitting with center on a line ⋮ A method for computing all values \({\lambda}\) such that \(A + {\lambda}B\) has a multiple eigenvalue ⋮ On Multiple Eigenvalues of a Matrix Dependent on a Parameter ⋮ Solving Singular Generalized Eigenvalue Problems by a Rank-Completing Perturbation ⋮ A high order continuation method to locate exceptional points and to compute Puiseux series with applications to acoustic waveguides ⋮ Nonlinearizing Two-parameter Eigenvalue Problems ⋮ The calculation of the distance to a nearby defective matrix ⋮ Decompositions and coalescing eigenvalues of symmetric definite pencils depending on parameters
This page was built for publication: Computing all Pairs (λ,μ) Such That λ is a Double Eigenvalue of A+μB
