Original Articles

NORM ONE PROJECTIONS ON BANACH SPACES

Published in: Quaestiones Mathematicae
Volume 24 , issue 4 , 2001 , pages: 491–492

DOI: 10.1080/16073606.2001.9639235

Author(s): A.K. Gaur Department of Mathematics, USA

Keywords: 46H05 , 46J10 , 47B15 , 47B48 , 46H05 , 46J10 , 47B15 , 47B48

Abstract

This note deals with a small but an important observation of hermitian operators on Banach spaces. It is known that if A is a complex Banach space, B(A) is the set of all operators on A, and H(B(A)) is the set of all hermitian operators, then B(A) = H(B(A)) + iH(B(A)) implies that A is a Hilbert space. We give a converse of this using norm one projections on A.

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