Title of article
Rank-preserving multiplicative maps on image Original Research Article
Author/Authors
Guimei Liu، نويسنده , , Jinchuan Hou، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2002
Pages
20
From page
59
To page
78
Abstract
Let X (H) be a Banach space (Hilbert space) and let
image
(
image
) be the algebra of all bounded linear operators on X(H). In this paper, we get some characterizations of rank-preserving multiplicative maps on
image
. As applications, we show that every multiplicative local approximate automorphism of
image
with the set of all rank-1 idempotents contained in its range is in fact an automorphism. We describe the structure of corank-preserving multiplicative maps on
image
. We also get a characterization of a *-isomorphism (or a conjugate *-isomorphism) on
image
by showing that there exists a unitary or conjugate linear unitary operator
image
such that Φ(T)=UTU * for all
image
if and only if Φ is multiplicative with the range containing all rank-1 projections and, for any A,
image
, A*B=0left right double arrowΦ(A)*Φ(B)=0.
Keywords
Rank , Corank , Multiplicative map , Isomorphism
Journal title
Linear Algebra and its Applications
Serial Year
2002
Journal title
Linear Algebra and its Applications
Record number
823458
Link To Document