Große Auswahl an günstigen Büchern
Schnelle Lieferung per Post und DHL

Inverse Linear Problems on Hilbert Space and their Krylov Solvability

Über Inverse Linear Problems on Hilbert Space and their Krylov Solvability

This book presents a thorough discussion of the theory of abstract inverse linear problems on Hilbert space. Given an unknown vector f in a Hilbert space H, a linear operator A acting on H, and a vector g in H satisfying Af=g, one is interested in approximating f by finite linear combinations of g, Ag, A2g, A3g, ¿ The closed subspace generated by the latter vectors is called the Krylov subspace of H generated by g and A. The possibility of solving this inverse problem by means of projection methods on the Krylov subspace is the main focus of this text. After giving a broad introduction to the subject, examples and counterexamples of Krylov-solvable and non-solvable inverse problems are provided, together with results on uniqueness of solutions, classes of operators inducing Krylov-solvable inverse problems, and the behaviour of Krylov subspaces under small perturbations. An appendix collects material on weaker convergence phenomena in general projection methods. This subject of this book lies at the boundary of functional analysis/operator theory and numerical analysis/approximation theory and will be of interest to graduate students and researchers in any of these fields.

Mehr anzeigen
  • Sprache:
  • Englisch
  • ISBN:
  • 9783030881610
  • Einband:
  • Taschenbuch
  • Seitenzahl:
  • 152
  • Veröffentlicht:
  • 11. Februar 2023
  • Ausgabe:
  • 23001
  • Abmessungen:
  • 155x9x235 mm.
  • Gewicht:
  • 242 g.
  Versandkostenfrei
  Sofort lieferbar

Beschreibung von Inverse Linear Problems on Hilbert Space and their Krylov Solvability

This book presents a thorough discussion of the theory of abstract inverse linear problems on Hilbert space. Given an unknown vector f in a Hilbert space H, a linear operator A acting on H, and a vector g in H satisfying Af=g, one is interested in approximating f by finite linear combinations of g, Ag, A2g, A3g, ¿ The closed subspace generated by the latter vectors is called the Krylov subspace of H generated by g and A. The possibility of solving this inverse problem by means of projection methods on the Krylov subspace is the main focus of this text.
After giving a broad introduction to the subject, examples and counterexamples of Krylov-solvable and non-solvable inverse problems are provided, together with results on uniqueness of solutions, classes of operators inducing Krylov-solvable inverse problems, and the behaviour of Krylov subspaces under small perturbations. An appendix collects material on weaker convergence phenomena in general projection methods.
This subject of this book lies at the boundary of functional analysis/operator theory and numerical analysis/approximation theory and will be of interest to graduate students and researchers in any of these fields.

Kund*innenbewertungen von Inverse Linear Problems on Hilbert Space and their Krylov Solvability



Ähnliche Bücher finden
Das Buch Inverse Linear Problems on Hilbert Space and their Krylov Solvability ist in den folgenden Kategorien erhältlich:

Willkommen bei den Tales Buchfreunden und -freundinnen

Jetzt zum Newsletter anmelden und tolle Angebote und Anregungen für Ihre nächste Lektüre erhalten.