Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research Center
2251-7952
3
1
2014
01
01
A WEIGHTED LINEAR REGRESSION MODEL FOR IMPERCISE RESPONSE
1
17
EN
ALIREZA
ARABPOUR
DEPARTMENT OF STATISTICS, FACULTY OF MATHEMATICS AND
COMPUTER, SHAHID BAHONAR UNIVERSITY OF KERMAN,
KERMAN, IRAN.
arabpour@uk.ac.ir
MARZEI
AMINI
DEPARTMENT OF STATISTICS, FACULTY OF MATHEMATICS AND
COMPUTER, SHAHID BAHONAR UNIVERSITY OF KERMAN,
KERMAN, IRAN.
amini.marzei@gmail.com
10.22103/jmmrc.2014.1399
A weighted linear regression model with impercise response and p-real explanatory variables is analyzed. The LR fuzzy random variable is introduced and a metric is suggested for coping with this kind of variables. A least square solution for estimating the parameters of the model is derived. The result are illustrated by the means of some case studies.
Fuzzy Regression,Least Squares,Estimate,Imprecise Response
http://jmmrc.uk.ac.ir/article_1399.html
http://jmmrc.uk.ac.ir/article_1399_4a378c21235db7b005962224f5a35bb4.pdf
Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research Center
2251-7952
3
1
2014
01
01
ON THE SHEARLET TRANSFORM USING HYPERBOLIC FUNCTIONS
19
29
EN
RAJABALI
KAMYABI-GOL
FERDOWSI UNIVERSITY OF
MASHHAD
kamyabi@um.ac.ir
MASOUMEH
ZARE
FERDOWSI UNIVERSITY OF
MASHHAD
MINA
SADEGHINEZHAD
FERDOWSI UNIVERSITY OF
MASHHAD
10.22103/jmmrc.2014.1514
In this paper, we focus on the study of shearlet transform which isdened by using the hyperbolic functions. As a result we check an admissibilitycondition such that implies the reconstruction formula. To this end, we will usethe concept of the classical shearlet, which indicates the position and directionof a singularity.
Hyperbolic function,Continuous shearlae transform,Admis-
sibility condition
http://jmmrc.uk.ac.ir/article_1514.html
http://jmmrc.uk.ac.ir/article_1514_4913c6450d20bba4845f2fa53176a777.pdf
Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research Center
2251-7952
3
1
2014
01
01
Convergence Properties of Hermitian and Skew Hermitian Splitting Methods
31
36
EN
Faranges
Kyanfar
Shahid Bahonar University
kyanfar@uk.ac.ir
10.22103/jmmrc.2014.1529
In this paper we consider the solutions of linear systems of saddle point problems. By using the spectrum of a quadratic matrix polynomial, we study the eigenvalues of the iterative matrix of the Hermitian and skew Hermitian splitting method.
Splitting,Saddle point problem,Hermitian,Skew Hermitian
http://jmmrc.uk.ac.ir/article_1529.html
http://jmmrc.uk.ac.ir/article_1529_168f2cc2e17d3a6e799762d56b78a950.pdf