Abstract
The J-spectral factorization problem naturally arises in control theory and it plays an important role in H(infinity)-control, linear quadratic optimal control, Hankel norm approximation problem. Characterization of solution for control problems is sometimes given using the J-spectral factor(s). The paper has the nature of a survey article. We review the band method version of the Grassmannian approach for solving strictly contractive extension problems and the J-spectral factorization approach for solving the suboptimal Nehari problem in the setting of the Wiener algebra on the imaginary axis. The new (and modest) contributions is to clarify the connections between the two approaches.
| Original language | English |
|---|---|
| Pages (from-to) | 113-124 |
| Number of pages | 12 |
| Journal | Analele stiintifice ale universitatii al i cuza din iasi-Serie noua-Matematica |
| Volume | 57 |
| Publication status | Published - 2011 |
Keywords
- J-spectral factorization
- control theory
- contractive extensions
- INFINITE-DIMENSIONAL SYSTEMS
- HANKEL-NORM APPROXIMATIONS
- EQUALIZING VECTORS