Shahid Bahonar University of KermanJournal of Mahani Mathematical Research2251-79523220140301SOME NEW RESULTS ON REMOTEST POINTS IN NORMED SPACES3750153810.22103/jmmrc.2014.1538ENH.MazaheriYazd University0000-0001-8169-8655M.ZARENEJHADYazd UniversityJournal Article20160911In this paper, using the best proximity theorems for an extension<br />of Brosowski's theorem. We obtain other results on farthest points. Finally, we<br />dene the concept of e- farthest points. We shall prove interesting relationship<br />between the -best approximation and the e-farthest points in normed linear<br />spaces (X; ||.||). If z in W is a e-farthest point from an x in X, then z is also a<br />-best approximation in W.Shahid Bahonar University of KermanJournal of Mahani Mathematical Research2251-79523220140301Gauss-Sidel and Successive Over Relaxation Iterative Methods for Solving System of Fuzzy Sylvester Equations5160154110.22103/jmmrc.2014.1541ENFatemehSalary Pour Sharif AbadDepartment of Mathematics, Shahid Bahonar University of Kerman,AzimRivazDepartment of Mathematics, Shahid Bahonar University of KermanJournal Article20160504In this paper, we present Gauss-Sidel and successive over relaxation (SOR) iterative methods for finding the approximate solution system of fuzzy Sylvester equations (SFSE), AX + XB = C, where A and B are two m*m crisp matrices, C is an m*m fuzzy matrix and X is an m*m unknown matrix. Finally, the proposed iterative methods are illustrated by solving one example.Shahid Bahonar University of KermanJournal of Mahani Mathematical Research2251-79523220170315Stability analysis of fractional-order nonlinear Systems via Lyapunov method6173396610.22103/jmmrc.2014.1561ENAliBayatiDEPARTMENT OF APPLIED MATHEMATICS, SHAHREKORD UNIVERSITY, P. O. BOX 115, SHAHREKORD, IRAN.RezaKhoshsiarDEPARTMENT OF APPLIED MATHEMATICS, SHAHREKORD UNIVERSITY, P. O. BOX 115, SHAHREKORD, IRAN.JavadAlidoustiDEPARTMENT OF APPLIED MATHEMATICS, SHAHREKORD UNIVERSITY, P. O. BOX 115, SHAHREKORD, IRAN.Journal Article20150916In this paper, we study stability of fractional-order nonlinear dynamic systems by means of Lyapunov method. To examine the obtained results, we employe the developed techniques on test examples.