Add to ORKGThe classical definition of convergence of a sequence {s„} of real numbers may be extended by permitting the defining inequality to fail on an infinite, but relatively small,exceptional set of integers n. In this thesis the cases of exceptional sets of linear density zero and logarithmic density zero are considered. Basic properties of classical convergence are shown to hold for these cases, an example is constructed to show that a set of logarithmic density zero need not have linear density zero, and for each case a Tauberian condition sufficient to deduce classical convergence is provided
Statistical convergence and ideal convergence of real numbers, which are of great importance in the ...
The convergence properties and limiting behavior of several real sequences are studied by analytical...
Statistical convergence and ideal convergence of real numbers, which are of great importance in the ...
The classical definition of convergence of a sequence {s„} of real numbers may be extended by permit...
Convergent sequences of real numbers play a fundamental role in many different problems in system th...
In this paper, we introduce the concept of quasi statistical supremum, quasi statistical infimum of ...
summary:In this paper we use the notion of statistical convergence of infinite series naturally intr...
summary:In this paper we analyze relations among several types of convergences of bounded sequences,...
This thesis consists of six main parts. In the first part, the historical development of the subje...
summary:This paper is closely related to the paper of Harry I. Miller: Measure theoretical subsequen...
summary:In this paper the ideas of three types of statistical convergence of a sequence of random va...
summary:The notion of sequential convergence on a lattice is defined in a natural way. In the presen...
In this article we look at how the convergence and divergence of real sequences are defined. We will...
AbstractOur paper is devoted to ernbeddings of the rational numbers Q into exotic groups, linear spa...
AbstractThe idea of statistical convergence was first introduced by Fast (1951) but the rapid develo...
Statistical convergence and ideal convergence of real numbers, which are of great importance in the ...
The convergence properties and limiting behavior of several real sequences are studied by analytical...
Statistical convergence and ideal convergence of real numbers, which are of great importance in the ...
The classical definition of convergence of a sequence {s„} of real numbers may be extended by permit...
Convergent sequences of real numbers play a fundamental role in many different problems in system th...
In this paper, we introduce the concept of quasi statistical supremum, quasi statistical infimum of ...
summary:In this paper we use the notion of statistical convergence of infinite series naturally intr...
summary:In this paper we analyze relations among several types of convergences of bounded sequences,...
This thesis consists of six main parts. In the first part, the historical development of the subje...
summary:This paper is closely related to the paper of Harry I. Miller: Measure theoretical subsequen...
summary:In this paper the ideas of three types of statistical convergence of a sequence of random va...
summary:The notion of sequential convergence on a lattice is defined in a natural way. In the presen...
In this article we look at how the convergence and divergence of real sequences are defined. We will...
AbstractOur paper is devoted to ernbeddings of the rational numbers Q into exotic groups, linear spa...
AbstractThe idea of statistical convergence was first introduced by Fast (1951) but the rapid develo...
Statistical convergence and ideal convergence of real numbers, which are of great importance in the ...
The convergence properties and limiting behavior of several real sequences are studied by analytical...
Statistical convergence and ideal convergence of real numbers, which are of great importance in the ...