Isomorphisms of algebras of Colombeau generalized functions

A. Delcroix; E. Zeidler; G. Hörmann; G.W. Mackey; Hans Vernaeve; I. Kolár; J. Aragona; J. Aragona; J. Grabowski; J. Mrčun; J.-F. Colombeau; J.W. Roever de; L. Schwartz; L. Schwartz; M. Grosser; M. Grosser; M. Kunzinger; M. Kunzinger; M. Kunzinger; M. Nedeljkov; M. Oberguggenberger; M. Oberguggenberger; M.W. Hirsch; N. Dapić; R. Steinbauer; R.V. Kadison

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Isomorphisms of algebras of Colombeau generalized functions

Authors: A. Delcroix
E. Zeidler
G. Hörmann
G.W. Mackey
Hans Vernaeve
I. Kolár
J. Aragona
J. Aragona
J. Grabowski
J. Mrčun
J.-F. Colombeau
J.W. Roever de
L. Schwartz
L. Schwartz
M. Grosser
M. Grosser
M. Kunzinger
M. Kunzinger
M. Kunzinger
M. Nedeljkov
M. Oberguggenberger
M. Oberguggenberger
M.W. Hirsch
N. Dapić
R. Steinbauer
R.V. Kadison
Publication date: 21 December 2006
Publisher: 'Springer Science and Business Media LLC'
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Abstract

We show that for smooth manifolds X and Y, any isomorphism between the special algebra of Colombeau generalized functions on X, resp. Y is given by composition with a unique Colombeau generalized function from Y to X. We also identify the multiplicative linear functionals from the special algebra of Colombeau generalized functions on X to the ring of Colombeau generalized numbers. Up to multiplication with an idempotent generalized number, they are given by an evaluation map at a compactly supported generalized point on X.Comment: 10 page

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