Pettis integration via statistical convergence
Journal Title: JOURNAL OF ADVANCES IN MATHEMATICS - Year 2013, Vol 3, Issue 2
Abstract
In this paper we extend the usual concept of Pettis integration to a statistical form. In order to achieve this, A we prove some necessary statements such as Vitali theorem and A use the statistically compactness. We obtain some properties of statistical Pettis integration which are well known for the Pettis integration.
Authors and Affiliations
Anita Caushi, Agron Tato
On the bounds of the expected nearest neighbor distance
In this paper, we give some contributions for special distributions having unbounded support for which we derive upper and lower bounds on the expected nearest neighbor distance of the extreme value (Gu...
Application of Search Model to Detect Urhobo Names in Niger Delta Region of Nigeria: A Preliminary Study
This paper is designed to determine the accuracy of search words or names from a database using search vector. Generally, database consists of large collection of information. By specifying the search words or names this...
Iterative Algorithm for the Effects of Atmospheric Refraction on the Equatorial Coordinates of a Star Valid for any Zenith Distance
In the present paper an efficient algorithm will be established for the effects of atmospheric refraction on the equatorial coordinates of a star valid for any zenith distance The algorithm uses two new...
On Rough Covexsity Sets
In this paper, we introduced new concepts for surely and possibly , start shaped (convex ) set. Also for rough start shaped ( rough convex) set .We established the neccessary and sufficient conditions for a set to be sta...
Generalized Rayleigh-quotient Formulas for the Real Parts, Imaginary Parts, and Moduli of the Eigenvalues of Diagonalizable Matrices
In the present paper, generalized Rayleigh-quotient formulas for the real parts, imaginary parts, and moduli of the eigenvalues of diagonalizable matrices are derived. These formulas are new and correspond to s...