info:eu-repo/semantics/article
Schur complements in Krein spaces
Fecha
2007-12Registro en:
Maestripieri, Alejandra Laura; Martinez Peria, Francisco Dardo; Schur complements in Krein spaces; Birkhauser Verlag Ag; Integral Equations and Operator Theory; 59; 2; 12-2007; 207-221
0378-620X
1420-8989
CONICET Digital
CONICET
Autor
Maestripieri, Alejandra Laura
Martinez Peria, Francisco Dardo
Resumen
The aim of this work is to generalize the notions of Schur complements and shorted operators to Krein spaces. Given a (bounded) J-selfadjoint operator A (with the unique factorization property) acting on a Krein space H and a suitable closed subspace S of H, the Schur complement A/[s]of A to S is defined. The basic properties of A/ are developed and different characterizations are given, most of them resembling those of the shorted of (bounded) positive operators on a Hilbert space.