University of Maragheh
Sahand Communications in Mathematical Analysis
2322-5807
2423-3900
03
1
2016
02
01
A new sequence space and norm of certain matrix operators on this space
1
12
EN
Hadi
Roopaei
Department of Mathematics, Vali-e-Asr University of Rafsanjan, Rafsanjan, Iran.
h.roopaei@gmail.com
Davoud
Foroutannia
Department of Mathematics, Vali-e-Asr University of Rafsanjan,
Rafsanjan, Iran.
foroutan@vru.ac.ir
In the present paper, we introduce the sequence space \[{l_p}(E,\Delta) = \left\{ x = (x_n)_{n = 1}^\infty : \sum_{n = 1}^\infty \left| \sum_{j \in {E_n}} x_j - \sum_{j \in E_{n + 1}} x_j\right| ^p < \infty \right\},\] where $E=(E_n)$ is a partition of finite subsets of the positive integers and $p\ge 1$. We investigate its topological properties and inclusion relations. Moreover, we consider the problem of finding the norm of certain matrix operators from $l_p$ into $ l_p(E,\Delta)$, and apply our results to Copson and Hilbert matrices.
Difference sequence space,Matrix domains,norm,Copson matrix,Hilbert matrix
https://scma.maragheh.ac.ir/article_18569.html
https://scma.maragheh.ac.ir/article_18569_d37578addf12775560a0dd1348a14dea.pdf
University of Maragheh
Sahand Communications in Mathematical Analysis
2322-5807
2423-3900
03
1
2016
02
01
The approximate solutions of Fredholm integral equations on Cantor sets within local fractional operators
13
20
EN
Hassan
Kamil Jassim
0000-0001-5715-7752
Department of Mathematics, Faculty of Education for Pure Sciences, University of Thi-Qar, Nasiriyah, Iraq.
hassan.kamil28@yahoo.com
In this paper, we apply the local fractional Adomian decomposition and variational iteration methods to obtain the analytic approximate solutions of Fredholm integral equations of the second kind within local fractional derivative operators. The iteration procedure is based on local fractional derivative. The obtained results reveal that the proposed methods are very efficient and simple tools for solving local fractional integral equations.
Fredholm integral equation,Local fractional Adomian decomposition method,Local fractional variational iteration method
https://scma.maragheh.ac.ir/article_17845.html
https://scma.maragheh.ac.ir/article_17845_a652d4a96c5d40bec32124ba5a31274e.pdf
University of Maragheh
Sahand Communications in Mathematical Analysis
2322-5807
2423-3900
03
1
2016
02
01
Some properties of fuzzy real numbers
21
27
EN
Bayaz
Daraby
0000-0001-6872-8661
Department of Mathematics, Faculty of Science, University of Maragheh, Maragheh, Iran.
bdaraby@maragheh.ac.ir
Javad
Jafari
Department of Mathematics, Faculty of Science, University of Maragheh, Maragheh, Iran.
javad.jafari33333@gmail.com
In the mathematical analysis, there are some theorems and definitions that established for both real and fuzzy numbers.
In this study, we try to prove Bernoulli's inequality in fuzzy real numbers with some of its applications. Also, we prove two other theorems in fuzzy real numbers which are proved before, for real numbers.
Fuzzy real number,Bernoulli's inequality,Real number
https://scma.maragheh.ac.ir/article_18685.html
https://scma.maragheh.ac.ir/article_18685_8eb1db4d00d23665dcf2e7857784a827.pdf
University of Maragheh
Sahand Communications in Mathematical Analysis
2322-5807
2423-3900
03
1
2016
02
01
Some study on the growth properties of entire functions represented by vector valued Dirichlet series in the light of relative Ritt orders
29
35
EN
Sanjib
Datta
Department of Mathematics, University of Kalyani, P.O.-Kalyani, Dist-Nadia, PIN-\ 741235, West Bengal, India.
sanjib_kr_datta@yahoo.co.in
Tanmay
Biswas
Rajbari, Rabindrapalli, R. N. Tagore Road, P.O.-Krishnagar, Dist-Nadia, PIN-741101, West Bengal, India.
tanmaybiswas_math@rediffmail.com
Pranab
Das
Department of Mathematics, University of Kalyani, P.O.-Kalyani, Dist-Nadia, PIN-741235, West Bengal, India.
pranabdas90@gmail.com
For entire functions, the notions of their growth indicators such as Ritt order are classical in complex analysis. But the concepts of relative Ritt order of entire functions and as well as their technical advantages of not comparing with the growths of $\exp \exp z$ are not at all known to the researchers of this area. Therefore the studies of the growths of entire functions in the light of their relative Ritt order are the prime concern of this paper. Actually in this paper we establish some newly developed results related to the growth rates of entire functions on the basis of their relative Ritt order (respectively, relative Ritt lower order).
Vector valued,Dirichlet series (VVDS),Relative Ritt order,Relative Ritt lower order,growth
https://scma.maragheh.ac.ir/article_18094.html
https://scma.maragheh.ac.ir/article_18094_663f26d0249c7fa7dd6e83e21ad32d04.pdf
University of Maragheh
Sahand Communications in Mathematical Analysis
2322-5807
2423-3900
03
1
2016
02
01
Numerical solution of a class of nonlinear two-dimensional integral equations using Bernoulli polynomials
37
51
EN
Sohrab
Bazm
0000-0002-1531-6636
Department of Mathematics, Faculty of Science, University of Maragheh, Maragheh, Iran.
sbazm@maragheh.ac.ir
In this study, the Bernoulli polynomials are used to obtain an approximate solution of a class of nonlinear two-dimensional integral equations. To this aim, the operational matrices of integration and the product for Bernoulli polynomials are derived and utilized to reduce the considered problem to a system of nonlinear algebraic equations. Some examples are presented to illustrate the efficiency and accuracy of the method.
Nonlinear two-dimensional integral equations,Bernoulli polynomials,Collocation method,Operational matrices
https://scma.maragheh.ac.ir/article_15994.html
https://scma.maragheh.ac.ir/article_15994_6d676e68a2b7a882c1334cdc50d1acf4.pdf
University of Maragheh
Sahand Communications in Mathematical Analysis
2322-5807
2423-3900
03
1
2016
02
01
On strongly Jordan zero-product preserving maps
53
61
EN
Ali Reza
Khoddami
0000-0002-9428-8185
Department of Pure Mathematics, University of Shahrood, P. O. Box 3619995161-316, Shahrood, Iran.
khoddami.alireza@shahroodut.ac.ir
In this paper, we give a characterization of strongly Jordan zero-product preserving maps on normed algebras as a generalization of Jordan zero-product preserving maps. In this direction, we give some illustrative examples to show that the notions of strongly zero-product preserving maps and strongly Jordan zero-product preserving maps are completely different. Also, we prove that the direct product and the composition of two strongly Jordan zero-product preserving maps are again strongly Jordan zero-product preserving maps. But this fact is not the case for tensor product of them in general. Finally, we prove that every $*-$preserving linear map from a normed $*-$algebra into a $C^*-$algebra that strongly preserves Jordan zero-products is necessarily continuous.
Strongly zero-product preserving map,Strongly Jordan zero-product preserving map,Zero-product preserving map,Jordan zero-product preserving map,Tensor product
https://scma.maragheh.ac.ir/article_18096.html
https://scma.maragheh.ac.ir/article_18096_d23368a43afbd4357de9825202e142e0.pdf
University of Maragheh
Sahand Communications in Mathematical Analysis
2322-5807
2423-3900
03
1
2016
02
01
Parabolic starlike mappings of the unit ball $B^n$
63
70
EN
Samira
Rahrovi
0000-0002-3781-5698
Department of Mathematics, Faculty of Basic Science, University of Bonab, P.O. Box 5551-761167, Bonab, Iran.
sarahrovi@gmail.com
Let $f$ be a locally univalent function on the unit disk $U$. We consider the normalized extensions of $f$ to the Euclidean unit ball $B^n\subseteq\mathbb{C}^n$ given by $$\Phi_{n,\gamma}(f)(z)=\left(f(z_1),(f'(z_1))^\gamma\hat{z}\right),$$ where $\gamma\in[0,1/2]$, $z=(z_1,\hat{z})\in B^n$ and $$\Psi_{n,\beta}(f)(z)=\left(f(z_1),(\frac{f(z_1)}{z_1})^\beta\hat{z}\right),$$ in which $\beta\in[0,1]$, $f(z_1)\neq 0$ and $z=(z_1,\hat{z})\in B^n$. In the case $\gamma=1/2$, the function $\Phi_{n,\gamma}(f)$ reduces to the well known Roper-Suffridge extension operator. By using different methods, we prove that if $f$ is parabolic starlike mapping on $U$ then $\Phi_{n,\gamma}(f)$ and $\Psi_{n,\beta}(f)$ are parabolic starlike mappings on $B^n$.
Roper-Suffridge extention operator,Biholomorphic mapping,Parabolic starlike function
https://scma.maragheh.ac.ir/article_17820.html
https://scma.maragheh.ac.ir/article_17820_b9493019b43e586b7325e86fcd33c0a4.pdf