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MCS
2011
Springer

Locating coalescing singular values of large two-parameter matrices

13 years 7 months ago
Locating coalescing singular values of large two-parameter matrices
Consider a matrix valued function A(x) ∈ Rm×n , m ≥ n, smoothly depending on parameters x ∈ Ω ⊂ R2 , where Ω is simply connected and bounded. We consider a technique to locate parameter values where some of the q dominant (q ≤ n) singular values of A coalesce, in the specific case when A is large and m > n ≫ q. Notation. An m × n real matrix is indicated with A ∈ Rm×n. We always consider the 2-norm for vectors and matrices. A matrix valued function A : R → Rm×n, continuous with its first l derivatives (l ≥ 0), is indicated as A ∈ Cl(R, Rm×n). If l = 0, we also simply write A ∈ C. If A ∈ Cl(R, Rm×n) is periodic of (minimal) period τ > 0, we write it as A ∈ Cl τ (R, Rm×n). With Ω ⊂ R2 we indicate an open and bounded simply connected planar region, and x = (x1, x2) will be coordinates in Ω. For a function A(x), x ∈ Ω, we will write A ∈ Cl(Ω, Rm×n) as appropriate.
Luca Dieci, Maria Grazia Gasparo, Alessandra Papin
Added 14 May 2011
Updated 14 May 2011
Type Journal
Year 2011
Where MCS
Authors Luca Dieci, Maria Grazia Gasparo, Alessandra Papini, Alessandro Pugliese
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