Department of Applied Science gives Master all the properties of fuzzy measurement uncertainty Groups

Back

Department of Applied Science gives Master all the properties of fuzzy measurement uncertainty Groups
branchs of mathematics and computer applications in the Department of Applied Science at the University of Technology grant master's degree in applied mathematics student Jaffar Omran Musa for his tagged "properties of fuzzy measurement on foggy groups" in the debate, which was held on the late Hall of Prof. Abdul Muttalib Ibrahim Sheikh in the same department.
The committee consisted of discussion of:
chairman :Prof. Dr. Fadel Subhi Fadel Nahrain University / College of Science / Mathematics Department
members: Prof. Dr. Radi Ibrahim Mohammed Al-Nahrain University / College of Science for Girls / Department of Mathematics and dr. Shatha Asad Salman
supervisor : dr. Jihad Khidr Ramadan
scientific expert :Prof. Dr. Munir Abdul Khaliq Aziz
linguistical expert:.dr. Najim Abdul-Kadhim Jawad .
A researcher in his thesis showed that it was a space defined lengths fuzzy definition on a fuzzy groups , as well as provide a definition for the convergence of the sequences that elements blurry points. The definition of continuity foggy and misty regular continuity of functions between the lengths space.
It provided the necessary and sufficient condition for the space lengths Blur to be hazy and then discussed the viability of cosine blurred. Then proved any space lengths and Blur, who owns a fully hazy him fully hazy sole. He knew stacking Blur for space lengths misty and foggy and full restriction proved if space is restricted lengths fuzzy hazy fully and completely, it would be compact, speckled, as well as a study has continuity foggy and misty regular continuity of functions defined on compact space lengths a misty fog.
At this stage of the letter introduced the concept of quasi-space lengths foggy defined on the set Illabh to prove that the cosine of fuzzy semi-space lengths Blur is Blur space lengths. Restriction blur of functions have been presented in a prelude to the definition of fuzzy length of functions and proved that space Blur lengths which consists of linear functions restricted hazy knowledge of space lengths Blur to space lengths foggy be completely blurred if Ẽ is completely blurred and also proved that any space lengths fuzzy ending dimension Tam will be blurred and finally knew dividing the space lengths foggy and misty known length of this space
Source : Uot Media Date :26/1/2017