Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research
2251-7952
2645-4505
1
2
2012
03
11
POSITIVE IMPLICATIVE HYPER MV -IDEALS OF TYPES 1,2,3,
AND 4
97
109
EN
L.
TORKZADEH
ISLAMIC AZAD UNIVERSITY
KERMAN
LTORKZADEH@YAHOO.COM
H.
HOJAT
ISLAMIC AZAD UNIVERSITY
KERMAN
HA_HODJAT@YAHOO.COM
10.22103/jmmrc.2012.510
In this paper rst we dene the notions of positive implicative<br />hyper MV -ideals of types 1,2,3 and 4 in hyper MV -algebras and we investigate<br />the relationship between of them . Then by some examples we show that these<br />notions are not equivalent. Finally we give some relations between these notions<br />and the notions of (weak) hyper MV -ideals and (weak) hyper MV -deductive<br />systems of hyper MV -algebras.
Hyper MV -algebra,Hyper MV -ideal,Hyper MV -deductive system,Positive implicative hyper MV -ideal
https://jmmrc.uk.ac.ir/article_510.html
https://jmmrc.uk.ac.ir/article_510_9c91b461769293b9b19e91ce9a81459a.pdf
Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research
2251-7952
2645-4505
1
2
2013
03
11
SHANNON ENTROPY IN ORDER STATISTICS AND THEIR
CONCOMITANS FROM BIVARIATE NORMAL DISTRIBUTION
111
118
EN
M.
NAGHAVY
YOUNG RESEARCHERS SOCIETY, SHAHID BAHONAR UNIVERSITY OF KERMAN, KERMAN, I.R.IRAN.
M.
MADADI
MAHANI MATHEMATICAL RESEARCH CENTER, SHAHID BAHONAR UNIVERSITY OF KERMAN, KERMAN, I.R.IRAN.
madadi@uk.ac.ir
V.
AMIRZADEH
DEPARTMENT OF STATISTICS,
SHAHID BAHONAR UNIVERSITY OF KERMAN, KERMAN, I.R.IRAN.
10.22103/jmmrc.2013.566
In this paper, we derive rst some results on the Shannon entropy<br />in order statistics and their concomitants arising from a sequence of f(Xi; Yi)<br />: i = 1; 2; :::g independent and identically distributed (iid) random variables<br />from the bivariate normal distribution and extend our results to a collection<br />C(X; Y ) = f(Xr1:n; Y[r1:n]); (Xr2:n; Y[r2:n]); :::; (Xrk:n; Y[rk:n])g of order sta-<br />tistics and their concomitants. We nally compute the value of the Shannon<br />entropy in order statistics and their concomitants from a bivariate normal<br />distribution.
Bivariate Normal Distribution,Concomitants of Order Statistics,Shan-
non Entropy
https://jmmrc.uk.ac.ir/article_566.html
https://jmmrc.uk.ac.ir/article_566_a7b91bb07df082cf32ea0e5730576038.pdf
Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research
2251-7952
2645-4505
1
2
2012
03
11
PERIODIC SOLUTIONS IN CERTAIN CLASS OF 3- DIMENSION
DISCONTINUOUS AUTONOMOUS SYSTEMS
119
136
EN
M.
Karimi Amaleh
0000-0001-6712-2625
HORMOZGAN UNIVERSITY
karimi@hormozgan.ac.ir
Zahra
Afsharnezhad
FERDOWSI UNIVERSITY OF MASHHAD
afsharnezhad@math.um.ac.ir
10.22103/jmmrc.2012.512
In the present paper the linear oscillator in R3 with z =constant<br />has been considered. The aim is to determine the necessary conditions for<br />the persistence of periodic solutions under discontinuous perturbations. A new<br />approach based on a computational method has been used. At the end we<br />apply our method on an example.
Perturbation,periodic solution,Discontinuous system
https://jmmrc.uk.ac.ir/article_512.html
https://jmmrc.uk.ac.ir/article_512_06fc92f50c6c3a4466dfc83876ec431f.pdf
Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research
2251-7952
2645-4505
1
2
2012
03
11
A RELATION BETWEEN THE CATEGORIES
Set
*
, SetT, Set AND SetT
137
145
EN
S.N.
HOSSEINI
SHAHID BAHONAR UNIVERSITY OF KERMAN
A.
ILAGHI-HOSSEINI
SHAHID BAHONAR UNIVERSITY OF KERMAN
10.22103/jmmrc.2012.513
In this article, we have shown, for the add-point monad T, the<br />partial morphism category Set<br />*<br />is isomorphic to the Kleisli category SetT. Also<br />we have proved that the category, SetT, of T-algebras is isomorphic to the<br />category Set of pointed sets. Finally we have established commutative squares<br />involving these categories.
monad,partial morphism category,category of pointed sets,Kleisli
category,category of T-algebras
https://jmmrc.uk.ac.ir/article_513.html
https://jmmrc.uk.ac.ir/article_513_1001bbf9e1d12e9ad6f8ffce187fdcdd.pdf
Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research
2251-7952
2645-4505
1
2
2012
03
11
GENERALIZED HIGHER-RANK NUMERICAL RANGE
163
168
EN
Hamid Reza
Afshin
Department of Mathematics, Vali-e-Asr University of Rafsanjan, Rafsanjan, Iran.
afshin@vru.ac.ir
Hadis
Izadi
VALI-E-ASR UNIVERSITY OF
RAFSANJAN
h_izadi2005@yahoo.com
Mohammad Ali
Mehrjoofard
VALI-E-ASR UNIVERSITY OF
RAFSANJAN
aahaay@gmail.com
10.22103/jmmrc.2012.515
In this note, a generalization of higher rank numerical range is<br />introduced and some of its properties are investigated
generalized projector,higher rank numerical range,generalized higher
rank numerical range
https://jmmrc.uk.ac.ir/article_515.html
https://jmmrc.uk.ac.ir/article_515_25be440e64644995acdbe4d52f6a69b9.pdf
Shahid Bahonar University of Kerman
Journal of Mahani Mathematical Research
2251-7952
2645-4505
1
2
2012
03
11
SOME CHARACTERIZATIONS OF HYPER MV -ALGEBRAS
147
161
EN
L.
TORKZADEH
KERMAN BRANCH, ISLAMIC AZAD UNIVERSITY
LTORKZADEH@YAHOO.COM
SH.
GHORBANI
BAM HIGHER EDUCATION COMPLEXES
SH.GHORBANI@MAIL.UK.AC.IR
10.22103/jmmrc.2012.514
In this paper we characterize hyper MV -algebras in which 0 or<br />1 are scalar elements . We prove that any nite hyper MV -algebra that 0<br />is a scaler element in it, is an MV -algebra. Finally we characterize hyper<br />MV -algebras of order 2 and order 3.
Hyper MV -algebra,MV -algebra
https://jmmrc.uk.ac.ir/article_514.html
https://jmmrc.uk.ac.ir/article_514_bbc89f5b755cc4ac68446ca738e9f73e.pdf