1982
DOI: 10.7146/math.scand.a-11980
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A result on two one-parameter groups of automorphisms.

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Cited by 6 publications
(15 citation statements)
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“…It was shown in [7] that if A is a von Neumann algebra and a and 0 are weakly continuous (that is, at{a) -> a, /?t(a) -* a ultraweakly as t -• 0, for each a in A), then there is a central projection p in A, independent of £ and invariant under a and /?, such that fi t \Ap = a t \Ap, /? t |4(l -p) = ot-t \A(l -p) for all t. Now suppose that A is a C*-algebra, and a and /?…”
Section: Let a And (3 Be * -Automorphisms Of A C*-algebra A Such Thatmentioning
confidence: 99%
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“…It was shown in [7] that if A is a von Neumann algebra and a and 0 are weakly continuous (that is, at{a) -> a, /?t(a) -* a ultraweakly as t -• 0, for each a in A), then there is a central projection p in A, independent of £ and invariant under a and /?, such that fi t \Ap = a t \Ap, /? t |4(l -p) = ot-t \A(l -p) for all t. Now suppose that A is a C*-algebra, and a and /?…”
Section: Let a And (3 Be * -Automorphisms Of A C*-algebra A Such Thatmentioning
confidence: 99%
“…It is not possible to apply the result for von Neumann algebras to the extensions of a and (3 to actions on A**, since these extended actions may not be weakly continuous. Nevertheless, it is possible to carry through most of the steps of the proof in [7] (with appropriate interpretations of spectral subspace). Proposition 2.8 of [7] is no longer valid, but a new argument may be given to show that the norm-closure of the ideal K$ denned on page 270 is an ideal.…”
Section: Let a And (3 Be * -Automorphisms Of A C*-algebra A Such Thatmentioning
confidence: 99%
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