Extensions of orthomorphisms

A. W. Wickstead

doi:10.1017/S1446788700020966

Abstract

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We consider, on an Archimedean Riesz space, the spaces of all linear operators lying between two multiples of the identity (for the order), those leaving all ideals invariant and the order bounded orthomorphisms. We find, if E is uniformly complete, necessary and sufficient conditions for all such operators defined on sublattices of E to extend to the whole of E. Examples are given to show the role of uniform completeness. For the space of all orthomorphisms we give a sufficient condition on E for such an extension to exist.

References

Bigard, A. and Kejmel, K. (1969), ‘Sur les endomorphismes conservant les polaires d'un groupe réticulé Archimédien’, Bull. Soc. Math. France 97, 381–398.CrossRef Google Scholar

Conrad, P. F. and Diem, J. E. (1971), ‘The ring of polar preserving endomorphisms of an abelian lattice ordered group’, Illinois J. Math. 15, 224–240.CrossRef Google Scholar

Luxemburg, W. A. J. (1977), private communication.Google Scholar

Luxemburg, W. A. J. and Zaanen, A. C. (1971), Riesz spaces I (North-Holland, Amsterdam, London).Google Scholar

Meyer, M. (1977), ‘Quelques propriétés des homomorphismes d'espaces vectoriels réticulés’, preprint.Google Scholar

Wickstead, A. W. (1977), ‘Representation and duality of multiplication operator on Archimedean Riesz spaces’, Compositio Math. 35, 225–238.Google Scholar

Zaanen, A. C. (1975), ‘Examples of orthomorphisms’, J. Approximation Theory 13, 192–204.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Duhoux, Michel and Meyer, Mathieu 1983. Extended orthomorphisms on Archimedean Riesz spaces. Annali di Matematica Pura ed Applicata, Vol. 133, Issue. 1, p. 193.

Abramovich, Yuri A. 1983. Multiplicative representation of disjointness preserving operators. Indagationes Mathematicae (Proceedings), Vol. 86, Issue. 3, p. 265.

Dodds, P. G. 1984. Orthomorphisms of a commutative W*-algebra. Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics, Vol. 37, Issue. 2, p. 143.

Duhoux, Michel and Meyer, Mathieu 1984. Extension and inversion of extended orthomorphisms on Riesz spaces. Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics, Vol. 37, Issue. 2, p. 223.

de Pagter, B. 1984. A note on disjointness preserving operators. Proceedings of the American Mathematical Society, Vol. 90, Issue. 4, p. 543.

McPolin, P. T. N. and Wickstead, A. W. 1985. The order boundedness of band preserving operators on uniformly complete vector lattices. Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 97, Issue. 3, p. 481.

1985. Vol. 119, Issue. , p. 351.

CrossRef

Buskes, G. J. H. M. 1985. Extension of Riesz homomorphisms.I. Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics, Vol. 39, Issue. 1, p. 107.

Buskes, G. and van Rooij, A. 1989. Small Riesz spaces. Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 105, Issue. 3, p. 523.

Bukhvalov, A. V. 1991. Order-bounded operators in vector lattices and in spaces of measurable functions. Journal of Soviet Mathematics, Vol. 54, Issue. 5, p. 1131.

Boulabiar, Karim and Buskes, Gerard 2003. Polar decomposition of order bounded disjointness preserving operators. Proceedings of the American Mathematical Society, Vol. 132, Issue. 3, p. 799.

Wójtowicz, Marek and Wiśniewska, Halina 2015. The problem of central orthomorphisms in a class of F-lattices. Indagationes Mathematicae, Vol. 26, Issue. 2, p. 393.

Bayram, E. and Wickstead, A. W. 2017. L-weakly and M-weakly compact operators and the centre. Archiv der Mathematik, Vol. 109, Issue. 4, p. 355.

Wójtowicz, Marek and Wiśniewska, Halina 2020. A class of a non-Banach F-lattices E such that every orthomorphism on E is central with applications to Musielak–Orlicz sequence spaces. Journal of Mathematical Analysis and Applications, Vol. 492, Issue. 1, p. 124398.

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Extensions of orthomorphisms

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