Abstract
In Archimedean vector lattices bands can be introduced via three different coinciding notions. First, they are order closed ideals. Second, they are precisely those ideals which equal their double disjoint complements. The third concept is that of an ideal which contains the supremum of any of its bounded subsets, provided the supremum exists in the vector lattice. We investigate these three notions and their relationships in the more general setting of Archimedean pre-Riesz spaces. We introduce the notion of a supremum closed ideal, which is related to the third aforementioned notion in vector lattices. We show that for a directed ideal I in a pervasive pre-Riesz space with the Riesz decomposition property these three concepts coincide, provided the double disjoint complement of I is directed. In pervasive pre-Riesz spaces every directed band is supremum closed and every supremum closed directed ideal I equals its double disjoint complement, provided the double disjoint complement of I is directed. In general, in Archimedean pre-Riesz spaces the three notions differ. For this we provide appropriate counterexamples.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Notes
Note that though the order in Y is pointwise, the supremum and infimum are not pointwise, in general. The details can be seen below in the computation of the supremum of the two functions \(g_1\) and \(g_2\).
References
Abramovich, Y.A., Wickstead, A.W.: Regular operators from and into a small Riesz space. Indag. Math. N.S. 2(3), 257–274 (1991)
Aliprantis, C.D., Burkinshaw, O.: Positive Operators. Springer, New York (2006)
Aliprantis, C.D., Tourky, R.: Cones and duality. Graduate Studies in Mathematics, vol. 84. American Mathematical Society, Providence (2007)
Buskes, G., van Rooij, A.C.M.: The vector lattice cover of certain partially ordered groups. J. Aust. Math. Soc. (Ser. A) 54, 352–367 (1993)
Kalauch, A.: Structures and operators in pre-Riesz spaces and stability of positive linear systems. Habilitationsschrift, Technische Universität Dresden, Germany (2013)
Kalauch, A., Lemmens, B., van Gaans, O.: Riesz completions, functional representations, and anti-lattices. Positivity 18(1), 201–218 (2014)
Kalauch, A., Lemmens, B., van Gaans, O.: Bands in partially ordered vector spaces with order unit. Positivity 19(3), 489–511 (2015)
Kalauch, A., van Gaans, O.: Disjointness in partially ordered vector spaces. Positivity 10(3), 573–589 (2006)
Kalauch, A., van Gaans, O.: Bands in pervasive pre-Riesz spaces. Oper. Matrices 2(2), 177–191 (2008)
Kalauch, A., van Gaans, O.: Ideals and bands in pre-Riesz spaces. Positivity 12(4), 591–611 (2008)
Kalauch, A., van Gaans, O.: Tensor products of Archimedean partially ordered vector spaces. Positivity 4(14), 705–714 (2010)
Kalauch, A., van Gaans, O.: Directed ideals in partially ordered vector spaces. Indag. Math. (N.S.) 25(2), 296–304 (2014)
Luxemburg, W.A.J., Zaanen, A.C.: Riesz Spaces I. North-Holland Publishing Company, Amsterdam (1971)
van Gaans, O.: Seminorms on ordered vector spaces. Ph.D. thesis, Universiteit Nijmegen, The Netherlands (1999)
van Gaans, O.: Seminorms on ordered vector spaces that extend to seminorms on larger Riesz spaces. Indag. Math. (N.S.) 14(1), 15–30 (2003)
van Haandel, M.: Completions in Riesz space theory. Proefschrift (PhD thesis), Universiteit Nijmegen, The Netherlands (1993)
van Waaij, J.: Tensor products in Riesz space theory. Master’s thesis, Mathematical Institute, University of Leiden (2013)
Vulikh, B.Z.: Introduction to the Theory of Partially Ordered Spaces. Wolters-Noordhoff Ltd, Groningen (1967)
Vulikh, B. Z.: Geometrie der Kegel in normierten Räumen. De Gruyter, Translated from Russian and edited by M. R. Weber (2017)
Werner, D.: Funktionalanalysis. Springer, Berlin (2007)
Acknowledgements
The author thanks Anke Kalauch for her valuable comments and Onno van Gaans for his idea to investigate s-closed ideals and his contribution to Example 23.
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Malinowski, H. Order closed ideals in pre-Riesz spaces and their relationship to bands. Positivity 22, 1039–1063 (2018). https://doi.org/10.1007/s11117-018-0558-5
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11117-018-0558-5