Add to ORKGThe author generalizes the classical notions of weak convergence and strong convergence in measure theory. This is done by taking a set E together with two partial orders such that the first order satisfies the countable Dedekind condition (that is, every nonempty countable subset of E which is bounded above has a supremum), and the second order is also subject to certain conditions. Now take the set of all positive-valued functions on E which are increasing with respect to the first order. The usual concepts of measure theory, such as upper and lower envelopes of a function, weak convergence, etc., are adapted to this general setting. The results so developed are then applied to capacities and to certain special classes of capacities
We introduce an abstract treatment of the weak convergence for bounded monotone set functions which ...
AbstractWe introduce new types of convergence of sequences of measurable functions stronger than con...
AbstractIn this work wome connections are pursued between weak and strong convergence in the spaces ...
The author generalizes the classical notions of weak convergence and strong convergence in measure t...
This book provides a thorough exposition of the main concepts and results related to various types o...
In this article we prove that if $u_j, v_j, w\in\mathcal{E}(\Omega)$ such that $u_j,v_j\geq w$, $\fo...
A. Appert proved in [2] that every sequence of strong measures on a separable weakly locally compact...
2. Weak Convergence: the fundamental theorems 3. Maximal inequalities and chainin
Abstract. The hypo-convergence of upper semicontinuous functions provides a natural framework for th...
Of concern are some simple criteria about the convergence of sequences of positive linear operators ...
AbstractWe provide some new results on the weak convergence of sequences or nets lying in Lp((T, ∑, ...
We discuss three forms of convergence in distribution which are stronger than the normal weak conver...
We show that for a compact set $K\subset\C^d,$ the sequence of so-called optimal measures converges ...
In this paper we review analogues of narrow ( = weak) convergence of probability measures on a metri...
The purpose of the paper is to study the topology of the weak convergence of masses (i.e. positive b...
We introduce an abstract treatment of the weak convergence for bounded monotone set functions which ...
AbstractWe introduce new types of convergence of sequences of measurable functions stronger than con...
AbstractIn this work wome connections are pursued between weak and strong convergence in the spaces ...
The author generalizes the classical notions of weak convergence and strong convergence in measure t...
This book provides a thorough exposition of the main concepts and results related to various types o...
In this article we prove that if $u_j, v_j, w\in\mathcal{E}(\Omega)$ such that $u_j,v_j\geq w$, $\fo...
A. Appert proved in [2] that every sequence of strong measures on a separable weakly locally compact...
2. Weak Convergence: the fundamental theorems 3. Maximal inequalities and chainin
Abstract. The hypo-convergence of upper semicontinuous functions provides a natural framework for th...
Of concern are some simple criteria about the convergence of sequences of positive linear operators ...
AbstractWe provide some new results on the weak convergence of sequences or nets lying in Lp((T, ∑, ...
We discuss three forms of convergence in distribution which are stronger than the normal weak conver...
We show that for a compact set $K\subset\C^d,$ the sequence of so-called optimal measures converges ...
In this paper we review analogues of narrow ( = weak) convergence of probability measures on a metri...
The purpose of the paper is to study the topology of the weak convergence of masses (i.e. positive b...
We introduce an abstract treatment of the weak convergence for bounded monotone set functions which ...
AbstractWe introduce new types of convergence of sequences of measurable functions stronger than con...
AbstractIn this work wome connections are pursued between weak and strong convergence in the spaces ...