ACTA MATHEMATICA UNIVERSITATIS COMENIANAE
Vol. 65, 2 (1996)
pp. 161-169
ADJOINTABILITY OF OPERATORS ON HILBERT $C^*$-MODULES
V. M. MANUILOV
Abstract.
Can a functional $f\in H^*_A = \Hom_A(H_A;A)$ on the non-self-dual Hilbert module $H_A$ over a $C^*$-algebra $A$ be represented as an operator of some inner product by an element of the module $H_A$, this inner product being equivalent to the given one? We discuss this question and prove that for some classes of $C^*$-algebras the closure with respect to the given norm of unification of such functionals for all equivalent inner products coincides with the dual module $H^*_A$. We discuss the notion of compactness of operators in relation to representability of functionals. We also show how an operator on $H_A$ in some situations (e.g. if it is Fredholm) can be made adjointable by change of the inner product to an equivalent one.
AMS subject classification.
Keywords.
Download: Adobe PDF 
Compressed Postscript 
Acta Mathematica Universitatis Comenianae
Institute of Applied
Mathematics
Faculty of Mathematics,
Physics and Informatics
Comenius University
842 48 Bratislava, Slovak Republic
Telephone: + 421-2-60295111 Fax: + 421-2-65425882
e-Mail: amuc@fmph.uniba.sk
Internet: www.iam.fmph.uniba.sk/amuc
© Copyright 2001, ACTA MATHEMATICA
UNIVERSITATIS COMENIANAE