Riesz spaces with the order-continuity property. II

I continue to investigate Riesz spaces E with the property that every positive linear map from E to an Archimedean Riesz space is sequentially order-continuous. In order to give a criterion for the product of such spaces to be another, we are forced to investigate their internal structure, and to develop an ordinal hierarchy of such spaces.

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Riesz spaces with the order-continuity property. I

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100000244 ◽

1977 ◽

Vol 81 (1) ◽

pp. 31-42 ◽

Cited By ~ 8

Author(s):

D. H. Fremlin

Keyword(s):

Riesz Space ◽

Continuity Property ◽

Sequential Order ◽

Order Continuity ◽

Linear Map ◽

Riesz Spaces ◽

Quotient Spaces ◽

Positive Linear Map ◽

Order Continuous

A Riesz space E has the (sequential) order-continuity property if every positive linear map from E to an Archimedean Riesz space is (sequentially) order-continuous. This is the case if and only if the canonical maps from E to its Archimedean quotient spaces are all (sequentially) order-continuous. I relate these properties to others that have been described elsewhere.

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Small Riesz spaces

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100077902 ◽

1989 ◽

Vol 105 (3) ◽

pp. 523-536 ◽

Cited By ~ 20

Author(s):

G. Buskes ◽

A. van Rooij

Keyword(s):

Representation Theory ◽

Direct Method ◽

Riesz Space ◽

Pictorial Representation ◽

Representation Theorems ◽

Riesz Spaces ◽

Number Of Authors

Many facts in the theory of general Riesz spaces are easily verified by thinking in terms of spaces of functions. A proof via this insight is said to use representation theory. In recent years a growing number of authors has successfully been trying to bypass representation theorems, judging them to be extraneous. (See, for instance, [9,10].) In spite of the positive aspects of these efforts the following can be said. Firstly, avoiding representation theory does not always make the facts transparent. Reading the more cumbersome constructions and procedures inside the Riesz space itself one feels the need for a pictorial representation with functions, and one suspects the author himself of secret heretical thoughts. Secondly, the direct method leads to repeating constructions of the same nature over and over again.

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A Fubini Theorem in Riesz spaces for the Kurzweil-Henstock Integral

Journal of Function Spaces and Applications ◽

10.1155/2011/158412 ◽

2011 ◽

Vol 9 (3) ◽

pp. 283-304 ◽

Cited By ~ 4

Author(s):

A. Boccuto ◽

D. Candeloro ◽

A. R. Sambucini

Keyword(s):

Type Theorem ◽

Riesz Space ◽

Fubini Theorem ◽

Real Plane ◽

Henstock Integral ◽

Riesz Spaces

A Fubini-type theorem is proved, for the Kurzweil-Henstock integral of Riesz-space-valued functions defined on (not necessarily bounded) subrectangles of the “extended” real plane.

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Weak Semiprojectivity in Purely Infinite Simple C*-Algebras

Canadian Journal of Mathematics ◽

10.4153/cjm-2007-015-9 ◽

2007 ◽

Vol 59 (2) ◽

pp. 343-371 ◽

Cited By ~ 5

Author(s):

Huaxin Lin

Keyword(s):

Finite Subset ◽

Finitely Generated ◽

Linear Map ◽

C Algebras ◽

Direct Sum ◽

Finitely Generated Groups ◽

Positive Linear Map ◽

Universal Coefficient Theorem

AbstractLet A be a separable amenable purely infinite simple C*-algebra which satisfies the Universal Coefficient Theorem. We prove that A is weakly semiprojective if and only if Ki(A) is a countable direct sum of finitely generated groups (i = 0, 1). Therefore, if A is such a C*-algebra, for any ε > 0 and any finite subset ℱ ⊂ A there exist δ > 0 and a finite subset ⊂ A satisfying the following: for any contractive positive linear map L : A → B (for any C*-algebra B) with ∥L(ab) – L(a)L(b)∥ < δ for a, b ∈ there exists a homomorphism h: A → B such that ∥h(a) – L(a)∥ < ε for a ∈ ℱ.

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A Hake-Type Theorem for Integrals with Respect to Abstract Derivation Bases in the Riesz Space Setting

Mathematica Slovaca ◽

10.1515/ms-2015-0092 ◽

2015 ◽

Vol 65 (6) ◽

Cited By ~ 1

Author(s):

A. Boccuto ◽

V. A. Skvortsov ◽

F. Tulone

Keyword(s):

Measure Space ◽

Type Theorem ◽

Riesz Space ◽

Riesz Spaces ◽

Space Setting ◽

Type Integral ◽

Topological Measure ◽

Technical Properties

AbstractA Kurzweil-Henstock type integral with respect to an abstract derivation basis in a topological measure space, for Riesz space-valued functions, is studied. A Hake-type theorem is proved for this integral, by using technical properties of Riesz spaces.

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Ideal convergence in locally solid Riesz spaces

Filomat ◽

10.2298/fil1404797h ◽

2014 ◽

Vol 28 (4) ◽

pp. 797-809 ◽

Cited By ~ 3

Author(s):

Bipan Hazarika

Keyword(s):

Bounded Sequence ◽

Riesz Space ◽

Ideal Convergence ◽

Riesz Spaces ◽

Basic Properties ◽

Locally Solid Riesz Space ◽

Positive Integers ◽

The Ideal

An ideal I is a family of subsets of positive integers N which is closed under taking finite unions and subsets of its elements. In this paper, we introduce the concepts of ideal ?-convergence, ideal ?-Cauchy and ideal ?-bounded sequence in locally solid Riesz space endowed with the topology ?. Some basic properties of these concepts has been investigated. We also examine the ideal ?-continuity of a mapping defined on locally solid Riesz space.

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On generalized statistical convergence and boundedness of Riesz space-valued sequences

Filomat ◽

10.2298/fil1915989p ◽

2019 ◽

Vol 33 (15) ◽

pp. 4989-5002

Author(s):

Sudip Pal ◽

Sagar Chakraborty

Keyword(s):

Statistical Convergence ◽

Necessary Conditions ◽

Convergent Sequence ◽

Bounded Sequence ◽

Riesz Space ◽

Riesz Spaces ◽

Natural Density

We consider the notion of generalized density, namely, the natural density of weight 1 recently introduced in [4] and primarily study some sufficient and almost converse necessary conditions for the generalized statistically convergent sequence under which the subsequence is also generalized statistically convergent. Also we consider similar types of results for the case of generalized statistically bounded sequence. Some results are further obtained in a more general form by using the notion of ideals. The entire investigation is performed in the setting of Riesz spaces extending the recent results in [13].

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ON SEPARATE ORDER CONTINUITY OF ORTHOGONALLY ADDITIVE OPERATORS

Bukovinian Mathematical Journal ◽

10.31861/bmj2021.01.17 ◽

2021 ◽

Vol 9 (1) ◽

pp. 200-209

Author(s):

I. Krasikova ◽

O. Fotiy ◽

M. Pliev ◽

M. Popov

Keyword(s):

Order Continuity ◽

Vector Lattices ◽

Additive Operator ◽

Uniformly Convergent ◽

Orthogonally Additive Operator ◽

Orthogonally Additive ◽

Order Continuous ◽

Orthogonally Additive Operators

Our main result asserts that, under some assumptions, the uniformly-to-order continuity of an order bounded orthogonally additive operator between vector lattices together with its horizontally-to-order continuity implies its order continuity (we say that a mapping f : E → F between vector lattices E and F is horizontally-to-order continuous provided f sends laterally increasing order convergent nets in E to order convergent nets in F, and f is uniformly-to-order continuous provided f sends uniformly convergent nets to order convergent nets).

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Correction to: Unbounded order continuous operators on Riesz spaces

Positivity ◽

10.1007/s11117-019-00677-1 ◽

2019 ◽

Vol 23 (3) ◽

pp. 759-760

Author(s):

Akbar Bahramnezhad ◽

Kazem Haghnejad Azar

Keyword(s):

Riesz Spaces ◽

Continuous Operators ◽

Order Continuous

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VARIANTS OF ANDO–HIAI TYPE INEQUALITIES FOR DEFORMED MEANS AND APPLICATIONS

Glasgow Mathematical Journal ◽

10.1017/s0017089520000403 ◽

2020 ◽

pp. 1-18 ◽

Cited By ~ 1

Author(s):

MOHSEN KIAN ◽

MOHAMMAD SAL MOSLEHIAN ◽

YUKI SEO

Keyword(s):

Hilbert Space ◽

Norm Inequality ◽

Power Mean ◽

Variable Operator ◽

Linear Map ◽

Power Means ◽

Operator Mean ◽

Positive Linear Map ◽

Euclidean Mean

Abstract For an n-tuple of positive invertible operators on a Hilbert space, we present some variants of Ando–Hiai type inequalities for deformed means from an n-variable operator mean by an operator mean, which is related to the information monotonicity of a certain unital positive linear map. As an application, we investigate the monotonicity of the power mean from the deformed mean in terms of the generalized Kantorovich constants under the operator order. Moreover, we improve the norm inequality for the operator power means related to the Log-Euclidean mean in terms of the Specht ratio.

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