OTHERS_CITABLE
The Wave Equation in Non-classic Cases: Non-self Adjoint with Non-local and Non-periodic Boundary Conditions
In this paper has been studied the wave equation in some non-classic cases. In the rst case boundary conditions are non-local and non-periodic. At that case the associated spectral problem is a self-adjoint problem and consequently the eigenvalues are real. But the second case the associated spectral problem is non-self-adjoint and consequently the eigenvalues are complex numbers,in which two cases, the solutions of the problem are constructed by Fourier method. By compatibility conditions and asymptotic expansions of the Fourier coe cients, the convergence of series solutions are proved. At last series solution are established and the uniqueness of the solution is proved by a special way which has not been used in classic texts. .
http://ijmsi.ir/article-1-572-en.pdf
2014-05-01
1
12
10.7508/ijmsi.2014.01.001
Wave equation
Non-local &
non-periodic Boundary Conditions
Asymptotic expansion.
Mohammad
Jahanshahi
jahanshahi@azaruniv.edu
1
AUTHOR
Asghar
Ahmadkhanlu
s.a.ahmadkhanlu@azaruniv.edu
2
AUTHOR
OTHERS_CITABLE
On Hyper Pseudo BCK-algebras
In this paper, we introduce the notion of hyper pseudo B C K - algebras, which is a generalization of pseudo BCK -algebras and hyper BCK -algebras and we investigates some related properties. In follow, we de ne some kinds of hyper pseudo BCK -ideals of a hyper pseudo BCK - algebra and we find the relations among them. Finally, we characterize the hyper pseudo BCK -ideals of type 4 generated by a nonempty subset.
http://ijmsi.ir/article-1-574-en.pdf
2014-05-01
13
29
10.7508/ijmsi.2014.01.002
Hyper pseudo BCK-algebras
Hyper pseudo BCK-ideals
Generated hyper pseudo BCK-ideals .
R. A.
Borzooei
borzooei@sbu.ac.ir
1
AUTHOR
A.
Rezazadeh
Rezazade2008@gmail.com
2
AUTHOR
R.
Ameri
rez_ameri@yahoo.com
3
AUTHOR
OTHERS_CITABLE
جوابهایی از نوع ماتریسهای قطری و تک جمله ای برای معادله ماتریسی AXB=C
http://ijmsi.ir/article-1-300-fa.pdf
2014-05-01
31
42
10.7508/ijmsi.2014.01.003
Diagonal and Monomial Solutions of the Matrix Equation AXB=C
In this article, we consider the matrix equation $AXB=C$, where A, B, C are given matrices and give new necessary and sufficient conditions for the existence of the diagonal solutions and monomial solutions to this equation. We also present a general form of such solutions. Moreover, we consider the least squares problem $min_X |C-AXB |_F$ where $X$ is a diagonal or monomial matrix. The explicit expressions of the optimal solution and the minimum norm solution are both provided.
http://ijmsi.ir/article-1-300-en.pdf
2014-05-01
31
42
10.7508/ijmsi.2014.01.003
Matrix equation
Diagonal matrix
Monomial matrix
Least squares problem.
Massoud
Aman
mamann@birjand.ac.ir
1
Author
AUTHOR
OTHERS_CITABLE
On the Graphs Related to Green Relations of Finite Semigroups
In this paper we develop an analog of the notion of the con- jugacy graph of nite groups for the nite semigroups by considering the Green relations of a nite semigroup. More precisely, by de ning the new graphs $Gamma_{L}(S)$, $Gamma_{H}(S)$, $Gamma_{J}(S)$ and $Gamma_{D}(S)$ (we name them the Green graphs) related to the Green relations L R J H and D of a nite semigroup S , we first attempt to prove that the graphs $Gamma_{D}(S)$ and $Gamma_{H}(S)$ have exactly one connected component, and this graphs for regu- lar semigroups are complete. And secondly, we give a necessary condition for a nite semigroup to be regular. This study shows an intrinsic di er- ence between the conjugacy graphs (of groups) and the Green graphs (of semigroups) as well. Finally, our calculations include two kinds of semi- groups, mostly involving the well known Lucas numbers, and examining the proved assertions.
http://ijmsi.ir/article-1-573-en.pdf
2014-05-01
43
51
10.7508/ijmsi.2014.01.004
Conjugacy graph
Regular semigroup
Green relations.
A.
Gharibkhajeh
a_gharib@iau-tnb.ac.ir
1
AUTHOR
H.
Doostie
doostih@gmail.com
2
AUTHOR
OTHERS_CITABLE
شبه گروه های چند گانه دوتایی دارای اتحادهای شبیه به اتحاد مدیال
http://ijmsi.ir/article-1-339-fa.pdf
2014-05-01
53
62
10.7508/ijmsi.2014.01.005
Binary Multiquasigroups with Medial-Like Equations
In this paper paramedial, co-medial and co-paramedial binary multiquasigroups are considered and a characterization of the corresponding component operations of these multiquasigroups is given.
http://ijmsi.ir/article-1-339-en.pdf
2014-05-01
53
62
10.7508/ijmsi.2014.01.005
Medial
Paramedial
Co-medial
Co-paramedial
Multiquasigroup
Mode.
Amir
Ehsani
a.ehsani@mahshahriau.ac.ir
1
Mahshahr Branch, Islamic Azad University
AUTHOR
Yuri
Movsisyan
yurimovsisyan@yahoo.com
2
Yerevan State University
AUTHOR
OTHERS_CITABLE
فضاهای بروالدی متقارن تعمیم یافته
http://ijmsi.ir/article-1-345-fa.pdf
2014-05-01
63
69
10.7508/ijmsi.2014.01.006
Generalized Symmetric Berwald Spaces
In this paper we study generalized symmetric Berwald spaces. We show that if a Berwald space $(M,F)$ admits a parallel $s-$structure then it is locally symmetric. For a complete Berwald space which admits a parallel s-structure we show that if the flag curvature of $(M,F)$ is everywhere nonzero, then $F$ is Riemannian.
http://ijmsi.ir/article-1-345-en.pdf
2014-05-01
63
69
10.7508/ijmsi.2014.01.006
Homogeneous Finsler space
Symmetric space
Generalized symmetric space
Berwald space.
Parastoo
Habibi
p.habibi@iau-astara.ac.ir
1
Department of Mathematics
AUTHOR
Asadollah
Razavi
arazavi@aut.ac.ir
2
Faculty of Mathematics and Computer Science
AUTHOR
OTHERS_CITABLE
نتایجی روی فضاهای نرمدار مخروطی
http://ijmsi.ir/article-1-360-fa.pdf
2014-05-01
71
80
10.7508/ijmsi.2014.01.007
Some Results on TVS-cone Normed Spaces and Algebraic Cone Metric Spaces
In this paper we introduce the cone bounded linear mapping and demonstrate a proof to show that the cone norm is continuous. Among other things, we prove the open mapping theorem and the closed graph theorem in TVS-cone normed spaces. We also show that under some restrictions on the cone, two cone norms are equivalent if and only if the topologies induced by them are the same. In the sequel, we introduce the notion of algebraically cone metric and we will show that every algebraically cone metric space has a topology.
http://ijmsi.ir/article-1-360-en.pdf
2014-05-01
71
80
10.7508/ijmsi.2014.01.007
Cone bounded
Equivalent cone norms
Algebraically cone metric.
Assadollah
Niknam
1
professor
AUTHOR
Saeedeh
Shamsi Gamchi
2
Ph.D student
AUTHOR
Mohammad
Janfada
3
associate professor
AUTHOR
OTHERS_CITABLE
On Hyperideal Structure of Ternary Semihypergroups
In this paper, we introduce and study the concepts of prime left, semiprime left and irreducible left hyperideals in ternary semihyper- groups and investigate some basic properties of them. We introduce the concepts of hyper lter and hypersemilattice congruence of ternary semi- hypergroups. We give some characterizations of hyper lters in ternary semihypergroups. Some relationships between hyper lters, prime hyper- ideals and hypersemilattice congruences in ternary semihypergroups are considered. We also introduce the notion of hyperideals extensions in ternary semihypergroups and some properties of them are investigated.
http://ijmsi.ir/article-1-575-en.pdf
2014-05-01
81
98
10.7508/ijmsi.2014.01.008
Semihypergroup
Ternary semihypergroup
Hyperideal
Prime left hyperideal
Semiprime left hyperideal
Irreducible left hyperideal
Hyper lter
Left m-system
Left i-system
Left p-system.
Kostaq
Hila
kostaq_hila@yahoo.com
1
AUTHOR
Bijan
Davvaz
davvaz@yazd.ac.ir
2
AUTHOR
Krisanthi
Naka
khila@uogj.edu.al
3
AUTHOR
CASE_STUDY
ABSTRACTS IN PERSIAN - Vol. 9, No. 1
Please see the full text contains the Pesian abstracts for this volume.
http://ijmsi.ir/article-1-844-en.pdf
2016-01-27
99
107
Name of Authors
in This Volume
1
AUTHOR