Congruences on *-Simple Type A I-Semigroups
Journal Title: JOURNAL OF ADVANCES IN MATHEMATICS - Year 2019, Vol 16, Issue 0
Abstract
This paper obtains a characterisation of the congruences on *-simple type A I-semigroups. The *-locally idempotent-separating congruences, strictly *-locally idempotent-separating congruences and minimum cancellative monoid congruences, are characterised.
Authors and Affiliations
Ugochukwu Ndubuisi, Asibong-Ibe U. I, Udoaka O. G
Solving a Rough Interval Linear Fractional Programming problem
In this paper, A rough interval linear fractional programming( RILFP)problem is introduced. The RILFP problemis considered by incorporating rough interval in the objective function coefficients. This proved the RILFP pro...
MHD DYNAMIC BOUNDARY LAYER FLOW OVER A PLANE PLAQUE
The problem of MHD dynamic boundary layer fluid sliding flow over a plane plaque is investigated. The von Karman™s integral method is applied to integrating the governing system of partial differential equations ov...
On norms of composition operators on weighted hardy spaces
The computation of composition operator on Hardy spaces is very hard. In this paper we propose a norm of a bounded composition operator on weighted Hardy spaces H2(b) induced by a disc automo...
On Totally (p,k) Quasiposinormal Operator
In this paper we study some properties of totally (p,k) - quasiposinormal operator. And also we show that Weyl's theorem and algebraically Weyl's theorem holds for totally (p,k) -quasiposinormal operator.
Uniqueness for Entropy Solutions to fully Nonlinear Equations
Let X be a metric space, the space of measurable funtions, be a domain whith boundary and a(x; ) be an operator of Leray-Lions type. If andare nondecreasing continuous function on R such...