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SANDWICHING C0-SEMIGROUPS

Published online by Cambridge University Press:  01 October 1999

J. M. A. M. VAN NEERVEN
Affiliation:
Department of Mathematics, Delft University of Technology, PO Box 5031, 2600 GA Delft, Netherlands; [email protected]
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Abstract

Let T = {T(t)}t[ges ]0 be a C0-semigroup on a Banach space X. The following results are proved.

(i) If X is separable, there exist separable Hilbert spaces X0 and X1, continuous dense embeddings j0[ratio ]X0X and j1[ratio ]XX1, and C0-semigroups T0 and T1 on X0 and X1 respectively, such that j0T0(t) = T(t) ∘ j0 and T1(t) ∘ j1 = j1T(t) for all t [ges ] 0.

(ii) If T is [odot ]-reflexive, there exist reflexive Banach spaces X0 and X1 , continuous dense embeddings j[ratio ]D(A2) → X0, j0[ratio ]X0X, j1[ratio ]XX1, and C0-semigroups T0 and T1 on X0 and X1 respectively, such that T0(t) ∘ j = jT(t), j0T0(t) = T(t) ∘ j0 and T(t) ∘ j1 = j1T(t) for all t [ges ] 0, and such that σ(A0) = σ(A) = σ(A1), where Ak is the generator of Tk, k = 0, [emptyv ], 1.

Type
Notes and Papers
Copyright
The London Mathematical Society 1999

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