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ON BOREL SETS IN FUNCTION SPACES WITH THE WEAK TOPOLOGY

Published online by Cambridge University Press:  17 November 2003

DENNIS K. BURKE
Affiliation:
Department of Mathematics, Miami University, Oxford, OH 45056, [email protected]
ROMAN POL
Affiliation:
Faculty of Mathematics, Informatics and Mechanics, Warsaw University, Banacha 2, 02-097 Warszawa, [email protected]
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Abstract

It is proved that the duality map $\langle\,,\rangle:(\ell^\infty,\hbox{weak})\times((\ell^\infty)^*,\hbox{weak}^* )\longrightarrow {\bf R}$ is not Borel. More generally, the evaluation $e:(C(K),\wk)\times K\longrightarrow{\bf R}$, $e(f,x) = f(x)$, is not Borel for any function space $C(K)$ on a compact $F$-space. It is also shown that a non-coincidence of norm-Borel and weak-Borel sets in a function space does not imply that the duality map is non-Borel.

Type
Notes and Papers
Copyright
The London Mathematical Society 2003

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Footnotes

The second author was partially supported by KBN grant 2 P03A 017 24.