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# G is either of Type I, Type II, or Type III, as its group von Neumann algebra W*(G) = C*(G)** is of Type I,

DOI link for G is either of Type I, Type II, or Type III, as its group von Neumann algebra W*(G) = C*(G)** is of Type I,

G is either of Type I, Type II, or Type III, as its group von Neumann algebra W*(G) = C*(G)** is of Type I, book

G × G is also of Type I, so following Rao [61] we can modify the × such that T

# G is either of Type I, Type II, or Type III, as its group von Neumann algebra W*(G) = C*(G)** is of Type I,

DOI link for G is either of Type I, Type II, or Type III, as its group von Neumann algebra W*(G) = C*(G)** is of Type I,

G is either of Type I, Type II, or Type III, as its group von Neumann algebra W*(G) = C*(G)** is of Type I, book

G × G is also of Type I, so following Rao [61] we can modify the × such that T

Byin §3.1 as follows. Let G be of Type I. We call the continuous process {X(t), Î G} strongly harmonizable if K Î B(G), so X is strongly harmonizable a measurable mapping T on is a

Edition 1st Edition

First Published 2004

Imprint CRC Press

Pages 1

eBook ISBN 9780429223976

## ABSTRACT

For the proof, see [66], §3.