AbstractIn the paper we define (and study the basic properties of) several concepts of convergence, divergence, and unboundedness in Archimedean Riesz spaces. The notions which we introduce will be used in order to obtain an extension of the Ornstein ratio ergodic theorem in a forthcoming paper
summary:In some recent papers, results of uniform additivity have been obtained for convergent seque...
AbstractIn this paper, we study order convergence and the order convergence structure in the context...
In this paper we consider almost everywhere convergence and divergence properties of various ergodic...
AbstractIn the paper we define (and study the basic properties of) several concepts of convergence, ...
AbstractIn the paper we extend the ergodic theorem of E. Hopf to a large class of Archimedean Riesz ...
ABSTRACT. Some versions of the divergence theorem are proved, for maps defined in suitable sets of I...
Countless theorems of analysis assert the convergence of sequences of numbers, functions, or element...
International audienceIn this expository paper, we survey nowadays classical tools or criteria used ...
117 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2001.Let (X, B , P) be a non-ato...
2-s2.0-85101696039The full lattice convergence on a locally solid Riesz space is an abstraction of t...
Some of the divergence conditions for Riesz means of Rademacher functions have been determined. A co...
In this paper we give a version of the Kondurar theorem for functions tak-ing values in Riesz spaces...
In this article questions on the possibility of sharpening classic ergodic theorems is considered. T...
A sequence $(x_n)$ in a locally solid Riesz space (E, ? ) is said to be statistically unbounded ? -c...
In this thesis we introduce several different types of series convergence in nor- med vector spaces ...
summary:In some recent papers, results of uniform additivity have been obtained for convergent seque...
AbstractIn this paper, we study order convergence and the order convergence structure in the context...
In this paper we consider almost everywhere convergence and divergence properties of various ergodic...
AbstractIn the paper we define (and study the basic properties of) several concepts of convergence, ...
AbstractIn the paper we extend the ergodic theorem of E. Hopf to a large class of Archimedean Riesz ...
ABSTRACT. Some versions of the divergence theorem are proved, for maps defined in suitable sets of I...
Countless theorems of analysis assert the convergence of sequences of numbers, functions, or element...
International audienceIn this expository paper, we survey nowadays classical tools or criteria used ...
117 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2001.Let (X, B , P) be a non-ato...
2-s2.0-85101696039The full lattice convergence on a locally solid Riesz space is an abstraction of t...
Some of the divergence conditions for Riesz means of Rademacher functions have been determined. A co...
In this paper we give a version of the Kondurar theorem for functions tak-ing values in Riesz spaces...
In this article questions on the possibility of sharpening classic ergodic theorems is considered. T...
A sequence $(x_n)$ in a locally solid Riesz space (E, ? ) is said to be statistically unbounded ? -c...
In this thesis we introduce several different types of series convergence in nor- med vector spaces ...
summary:In some recent papers, results of uniform additivity have been obtained for convergent seque...
AbstractIn this paper, we study order convergence and the order convergence structure in the context...
In this paper we consider almost everywhere convergence and divergence properties of various ergodic...
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