Bettina Blaimer Blaimer Optimal Domain and Integral Extension of Operators Acting in Frechet Function Spaces

Optimal Domain and Integral Extension of Operators Acting in Frechet Function Spaces

von Bettina Blaimer

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Beschreibung

It is known that a continuous linear operator T defined on a Banach function space X(μ) (over a finite measure space ( Omega,§igma,μ)) and with values in a Banach space X can be extended to a sort of optimal domain. Indeed, under certain assumptions on the space X(μ) and the operator T this optimal domain coincides with L¹(m₊T), the space of all functions integrable with respect to the vector measure m₊T associated with T, and the optimal extension of T turns out to be the integration operator I₊m₊T. In this book the idea is taken up and the corresponding theory is translated to a larger class of function spaces, namely to Fréchet function spaces X(μ) (this time over a σ-finite measure space ( Omega,§igma,μ)). It is shown that under similar assumptions on X(μ) and T as in the case of Banach function spaces the so-called ``optimal extension process'' also works for this altered situation. In a further step the newly gained results are applied to four well-known operators defined on the Fréchet function spaces L^p-([0,1]) resp. L^p-(G) (where G is a compact Abelian group) and L^p₊ textloc( mathbbR).

Autor*in

Bettina Blaimer

Themen in »Optimal Domain and Integral Extension of Operators Acting in Frechet Function Spaces«

Optimal domain process Fréchet function spaces Vector measures

Stimmen zu »Optimal Domain and Integral Extension of Operators Acting in Frechet Function Spaces«

Details

ISBN: 9783832545574
Verlag: Logos Berlin
Erscheinung: 30.09.2017

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