The canonical form of a scalar operator on a Banach space

Faulkner, G. D.; Huneycutt, J. E.

doi:10.1090/S0002-9939-1978-0487577-3

The canonical form of a scalar operator on a Banach space
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by G. D. Faulkner and J. E. Huneycutt PDF

Proc. Amer. Math. Soc. 71 (1978), 81-84 Request permission

Abstract:

Let $A = \smallint \lambda dE(\lambda )$ be a scalar operator on a Banach space X. If there exists a vector $g \in X$ such that the closed convex hull of the range of the vector measure $\mu ( \cdot ) = E( \cdot )g$ has nonvoid interior, then A is similar to the operator $Qf(\lambda ) = \lambda f(\lambda )$ on a quotient space of a suitably constructed ${\mathcal {L}^\infty }$ space.

References

The theory of linear operators in Hilbert space

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Igor Kluvánek and Greg Knowles, Vector measures and control systems, North-Holland Mathematics Studies, Vol. 20, North-Holland Publishing Co., Amsterdam-Oxford; American Elsevier Publishing Co., Inc., New York, 1976. MR 0499068