Transactions of the American Mathematical Society

Author(s): Michael Kunzinger; Roland Steinbauer; James A. Vickers
Journal: Trans. Amer. Math. Soc. 361 (2009), 5177-5192.
MSC (2000): Primary 46T30; Secondary 46F30, 53B20
Posted: April 21, 2009
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Abstract: This paper is part of an ongoing program to develop a theory of generalized differential geometry. We consider the space $\mathcal{G}[X,Y]$ of Colombeau generalized functions defined on a manifold

and taking values in a manifold

. This space is essential in order to study concepts such as flows of generalized vector fields or geodesics of generalized metrics. We introduce an embedding of the space of continuous mappings $\mathcal{C}(X,Y)$ into $\mathcal{G}[X,Y]$ and study the sheaf properties of $\mathcal{G}[X,Y]$ . Similar results are obtained for spaces of generalized vector bundle homomorphisms. Based on these constructions we propose the definition of a space $\mathcal{D}'[X,Y]$ of distributions on

taking values in

. $\mathcal{D}'[X,Y]$ is realized as a quotient of a certain subspace of $\mathcal{G}[X,Y]$ .

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Retrieve articles in Transactions of the American Mathematical Society with MSC (2000): 46T30, 46F30, 53B20

Michael Kunzinger
Affiliation: Department of Mathematics, University of Vienna, Nordbergstr. 15, A-1090 Wien, Austria
Email: michael.kunzinger@univie.ac.at

Roland Steinbauer
Affiliation: Department of Mathematics, University of Vienna, Nordbergstr. 15, A-1090 Wien, Austria
Email: roland.steinbauer@univie.ac.at

James A. Vickers
Affiliation: Faculty of Mathematical Studies, University of Southampton, Highfield, Southampton, SO17 1BJ, United Kingdom
Email: J.A.Vickers@maths.soton.ac.uk

DOI: 10.1090/S0002-9947-09-04621-2
PII: S 0002-9947(09)04621-2
Keywords: Algebras of generalized functions, Colombeau algebras, generalized functions on manifolds, manifold-valued distributions.
Received by editor(s): April 16, 2007
Received by editor(s) in revised form: August 24, 2007
Posted: April 21, 2009
Additional Notes: This work was supported by project P16742 and START-project Y-237 of the Austrian Science Fund
Copyright of article: Copyright 2009, American Mathematical Society

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