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The Semi-simplicity Manifold on Arbitrary Banach Spaces

โœ Scribed by R. Delaubenfels; S. Kantorovitz

Publisher
Elsevier Science
Year
1995
Tongue
English
Weight
864 KB
Volume
133
Category
Article
ISSN
0022-1236

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โœฆ Synopsis

For an arbitrary linear (possibly unbounded) operator (A) on a Banach space, with real spectrum, we construct a maximal continuously embedded Banach subspace on which this operator has a (C,(\mathbf{R})) functional calculus. We call this subspace, (Z), the semi-simplicity manifold for (A). When the original Banach space does not contain a copy of (c_{0}), the restriction of (A) to (Z) is a spectral operator of scalar type. We construct a functional calculus, (f \mapsto f\left(\left.A\right|{Z}\right)), from (C(R)) into the space of closed, densely defined operators on (Z); when (X) does not contain a copy of (c{0}), this map is defined for arbitrary Borel measurable (f). We also construct continuously embedded Banach subspaces on which the Fourier transform and the Hilbert transform are spectral operators of scalar type. "1495 Academic Press. Inc.

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