Your search keyword '"Malinowski, Helena"' showing total 5 results

1. Projection bands and atoms in pervasive pre-Riesz spaces.

Author

Kalauch, Anke and Malinowski, Helena

Subjects

RIESZ spaces, ATOMS, VECTOR spaces, SPACE

Abstract

In vector lattices, the concept of a projection band is a basic tool. We deal with projection bands in the more general setting of an Archimedean pre-Riesz space X. We relate them to projection bands in a vector lattice cover Y of X. If X is pervasive, then a projection band in X extends to a projection band in Y, whereas the restriction of a projection band B in Y is not a projection band in X, in general. We give conditions under which the restriction of B is a projection band in X. We introduce atoms and discrete elements in X and show that every atom is discrete. The converse implication is true, provided X is pervasive. In this setting, we link atoms in X to atoms in Y. If X contains an atom a > 0 , we show that the principal band generated by a is a projection band. Using atoms in a finite dimensional Archimedean pre-Riesz space X, we establish that X is pervasive if and only if it is a vector lattice. [ABSTRACT FROM AUTHOR]

Published

2021

2. Order Continuous Operators on Pre-Riesz Spaces and Embeddings.

Author

Kalauch, Anke and Malinowski, Helena

Subjects

*RIESZ spaces, *POSITIVE operators, *VECTOR spaces

Abstract

We investigate properties of order continuous operators on pre-Riesz spaces with respect to the embedding of the range space into a vector lattice cover or, in particular, into its Dedekind completion. We show that order continuity is preserved under this embedding for positive operators, but not in general. For the vector lattice l0 ∞ of eventually constant sequences, we consider the pre-Riesz space of regular operators on l0 ∞ and show that making the range space Dedekind complete does not provide a vector lattice cover of the pre-Riesz space. A similar counterexample is obtained for the directed part of the space of order continuous operators on l0 ∞. [ABSTRACT FROM AUTHOR]

Published

2019

3. Vector lattice covers of ideals and bands in Pre-Riesz spaces.

Author

Kalauch, Anke and Malinowski, Helena

Subjects

RIESZ spaces, VECTOR spaces, BANACH lattices, UTOPIAS, SPACE

Abstract

Pre-Riesz spaces are ordered vector spaces which can be order densely embedded into vector lattices, their so-called vector lattice covers. Given a vector lattice cover Y for a pre-Riesz space X, we address the question how to find vector lattice covers for subspaces of X, such as ideals and bands. We provide conditions such that for a directed ideal I in X its smallest extension ideal in Y is a vector lattice cover. We show a criterion for bands in X and their extension bands in Y as well. Moreover, we state properties of ideals and bands in X which are generated by sets, and of their extensions in Y. [ABSTRACT FROM AUTHOR]

Published

2019

4. Order closed ideals in pre-Riesz spaces and their relationship to bands.

Author

Malinowski, Helena

Subjects

ARCHIMEDEAN property, RIESZ spaces, PROBABILITY theory, HILBERT space, HOMOMORPHISMS

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. [ABSTRACT FROM AUTHOR]

Published

2018

5. On finite elements in $$f$$-algebras and in product algebras.

Author

Malinowski, Helena and Weber, Martin

Subjects

FINITE element method, RIESZ spaces, MULTIPLICATION, RING theory, ABSTRACT algebra, NUMERICAL analysis, EXISTENCE theorems

Abstract

Finite elements, which are well-known and studied in the framework of vector lattices, are investigated in $$\ell $$-algebras, preferably in $$f$$-algebras, and in product algebras. The additional structure of an associative multiplication leads to new questions and some new properties concerning the collections of finite, totally finite and self-majorizing elements. In some cases the order ideal of finite elements is a ring ideal as well. It turns out that a product of elements in an $$f$$-algebra is a finite element if at least one factor is finite. If the multiplicative unit exists, the latter plays an important role in the investigation of finite elements. For the product of special $$f$$-algebras an element is finite in the algebra if and only if its power is finite in the product algebra. [ABSTRACT FROM AUTHOR]

Published

2013