IAM   02674
INSTITUTO ARGENTINO DE MATEMATICA ALBERTO CALDERON
Unidad Ejecutora - UE
artículos
Título:
Strongly smooth paths of idempotents
Autor/es:
ESTEBAN ANDRUCHOW
Revista:
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS
Editorial:
ACADEMIC PRESS INC ELSEVIER SCIENCE
Referencias:
Lugar: Amsterdam; Año: 2011 vol. 378 p. 252 - 267
ISSN:
0022-247X
Resumen:
It is shown that a curve q(t), t ∈ I (0 ∈ I) of idempotent operators on a Banach space X,
which verifies that for each ξ ∈ X, the map t → q(t)ξ ∈ X is continuously differentiable,
can be lifted by means of a regular curve Gt , of invertible operators in X:
q(t) = Gtq(0)G−1
t , t ∈ I.
This is done by using the transport equation of the Grassmannian manifold, introduced
by Corach, Porta and Recht. We apply this result to the case when the idempotents are
conditional expectations of a C∗ algebra A onto a field of C∗-subalgebras Bt ⊂ A. In this
case the invertible operators, restricted to B0, induce C∗-isomorphisms between B0 and Bt .
We examine the regularity condition imposed on the curve of expectations, in the case
when these expectations are induced by discrete decompositions of a Hilbert space (also
called systems of projectors in the literature).