Maps on idempotents

Peter Šemrl

Studia Mathematica (2005)

  • Volume: 169, Issue: 1, page 21-44
  • ISSN: 0039-3223

Abstract

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Let X be an infinite-dimensional real or complex Banach space, B(X) the algebra of all bounded linear operators on X, and P(X) ⊂ B(X) the subset of all idempotents. We characterize bijective maps on P(X) preserving commutativity in both directions. This unifies and extends the characterizations of two types of automorphisms of P(X), with respect to the orthogonality relation and with respect to the usual partial order; the latter have been previously characterized by Ovchinnikov. We also describe bijective orthogonality preserving maps on the set of idempotents of a fixed finite rank. As an application we present a nonlinear extension of the structural result for bijective linear biseparating maps on B(X).

How to cite

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Peter Šemrl. "Maps on idempotents." Studia Mathematica 169.1 (2005): 21-44. <http://eudml.org/doc/284529>.

@article{PeterŠemrl2005,
abstract = {Let X be an infinite-dimensional real or complex Banach space, B(X) the algebra of all bounded linear operators on X, and P(X) ⊂ B(X) the subset of all idempotents. We characterize bijective maps on P(X) preserving commutativity in both directions. This unifies and extends the characterizations of two types of automorphisms of P(X), with respect to the orthogonality relation and with respect to the usual partial order; the latter have been previously characterized by Ovchinnikov. We also describe bijective orthogonality preserving maps on the set of idempotents of a fixed finite rank. As an application we present a nonlinear extension of the structural result for bijective linear biseparating maps on B(X).},
author = {Peter Šemrl},
journal = {Studia Mathematica},
keywords = {preservers; idempotents; commutativity; orthogonality; partial order},
language = {eng},
number = {1},
pages = {21-44},
title = {Maps on idempotents},
url = {http://eudml.org/doc/284529},
volume = {169},
year = {2005},
}

TY - JOUR
AU - Peter Šemrl
TI - Maps on idempotents
JO - Studia Mathematica
PY - 2005
VL - 169
IS - 1
SP - 21
EP - 44
AB - Let X be an infinite-dimensional real or complex Banach space, B(X) the algebra of all bounded linear operators on X, and P(X) ⊂ B(X) the subset of all idempotents. We characterize bijective maps on P(X) preserving commutativity in both directions. This unifies and extends the characterizations of two types of automorphisms of P(X), with respect to the orthogonality relation and with respect to the usual partial order; the latter have been previously characterized by Ovchinnikov. We also describe bijective orthogonality preserving maps on the set of idempotents of a fixed finite rank. As an application we present a nonlinear extension of the structural result for bijective linear biseparating maps on B(X).
LA - eng
KW - preservers; idempotents; commutativity; orthogonality; partial order
UR - http://eudml.org/doc/284529
ER -

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