EUDML

Currently displaying 1 – 6 of 6

Order by Relevance | Title | Year of publication

On isomorphisms of inner product spaces

David Buhagiar; Emmanuel Chetcuti — 2004

Mathematica Slovaca

On complete-cocomplete subspaces of an inner product space

David Buhagiar; Emmanuel Chetcuti — 2005

Applications of Mathematics

In this note we give a measure-theoretic criterion for the completeness of an inner product space. We show that an inner product space $S$ is complete if and only if there exists a $σ$ -additive state on $C (S)$ , the orthomodular poset of complete-cocomplete subspaces of $S$ . We then consider the problem of whether every state on $E (S)$ , the class of splitting subspaces of $S$ , can be extended to a Hilbertian state on $E (\bar{S})$ ; we show that for the dense hyperplane $S$ (of a separable Hilbert space) constructed by P. Pták and...

Locally realcompact and HN-complete spaces

David Buhagiar; Emmanuel Chetcuti — 2007

Commentationes Mathematicae Universitatis Carolinae

Two classes of spaces are studied, namely locally realcompact spaces and HN-complete spaces, where the latter class is introduced in the paper. Both of these classes are superclasses of the class of realcompact spaces. Invariance with respect to subspaces and products of these spaces are investigated. It is shown that these two classes can be characterized by demanding that certain equivalences hold between certain classes of Baire measures or by demanding that certain classes of Baire measures...

κ-compactness, extent and the Lindelöf number in LOTS

David Buhagiar; Emmanuel Chetcuti; Hans Weber — 2014

Open Mathematics

We study the behaviour of ℵ-compactness, extent and Lindelöf number in lexicographic products of linearly ordered spaces. It is seen, in particular, that for the case that all spaces are bounded all these properties behave very well when taking lexicographic products. We also give characterizations of these notions for generalized ordered spaces.

The order topology for a von Neumann algebra

Emmanuel Chetcuti; Jan Hamhalter; Hans Weber — 2015

Studia Mathematica

The order topology $τ_{o} (P)$ (resp. the sequential order topology $τ_{o s} (P)$ ) on a poset P is the topology that has as its closed sets those that contain the order limits of all their order convergent nets (resp. sequences). For a von Neumann algebra M we consider the following three posets: the self-adjoint part $M_{s a}$ , the self-adjoint part of the unit ball $M ¹_{s a}$ , and the projection lattice P(M). We study the order topology (and the corresponding sequential variant) on these posets, compare the order topology to the other...

Measure-Theoretic Characterizations of Certain Topological Properties

David Buhagiar; Emmanuel Chetcuti; Anatolij Dvurečenskij — 2005

Bulletin of the Polish Academy of Sciences. Mathematics

It is shown that Čech completeness, ultracompleteness and local compactness can be defined by demanding that certain equivalences hold between certain classes of Baire measures or by demanding that certain classes of Baire measures have non-empty support. This shows that these three topological properties are measurable, similarly to the classical examples of compact spaces, pseudo-compact spaces and realcompact spaces.

Page 1

Download Results (CSV)

Advanced Search