Islamic Azad University, Central tehran Branch
International Journal of Mathematical Modelling & Computations
2228-6225
2228-6233
7
4 (FALL)
2017
11
01
Perishable Inventory Model with Retrial Demands, Negative Customers and Multiple Working Vacations
239
254
EN
Vijaya Laxmi
Pikkala
Department of Applied Mathematics, Andhra University, Visakhapatnam, India. Pin- 530003
vijaya_iit2003@yahoo.co.in
Soujanya
M.L.
Department of Applied mathematics, Andhra University, Visakhapatnam, India. 530003
logintosouji@gmail.com
This paper presents the analysis of a continuous review perishable<br /> inventory system wherein the life time of each item follows an<br /> exponential distribution. The operating policy is (s,S) policy<br /> where the ordered items are received after a random time which<br /> follows exponential distribution. Primary arrival follows Poisson<br /> distribution and they may turnout to be positive or negative and<br /> then enter into the orbit. The orbiting demands compete their<br /> service according to exponential distribution. The server takes<br /> multiple working vacations at zero inventory. We assume that<br /> the vacation time, service times both during regular busy period<br /> and vacation period are exponentially distributed. Matrix analytic<br /> method is used for the steady state distribution of the model.<br /> Various performance measures and cost analysis are shown with<br /> numerical results.
Perishable inventory,(s,S) policy,Retrial demands,Negative customers,Multiple working vacations,Matrix analytic method
http://ijm2c.iauctb.ac.ir/article_663719.html
http://ijm2c.iauctb.ac.ir/article_663719_74a04f952743d47057405a453e8ee2f5.pdf
Islamic Azad University, Central tehran Branch
International Journal of Mathematical Modelling & Computations
2228-6225
2228-6233
7
4 (FALL)
2017
11
01
A Note on Solving Prandtl's Integro-Differential Equation
255
263
EN
Atta
Dezhbord
0000-0002-3307-6613
Department of Mathematics, Hamedan Branch, Islamic Azad University, Hamedan 65138, Iran
dezhbord22.ata@gmail.com
Taher
Lotfi
Department of Mathematics, Hamedan Branch, Islamic Azad University, Hamedan 65138, Iran
lotfi@iauh.ac.ir
A simple method for solving Prandtl's integro-differential equation is proposed based on a new reproducing kernel space. Using a transformation and modifying the traditional reproducing kernel method, the singular term is removed and the analytical representation of the exact solution is obtained in the form of series in the new reproducing kernel space. Compared with known investigations, its advantages are that the representation of the exact solution is obtained in a reproducing kernel Hilbert space and accuracy in numerical computation is higher. On the other hand, the approximate solution and its derivatives converge uniformly to the exact solution and its derivatives. The final numerical experiments illustrate the method is efficient.
Reproducing Kernel Space,Singular integro-differential equation of Prandtl's type,Hypersingular integral equation,Error estimation
http://ijm2c.iauctb.ac.ir/article_663720.html
http://ijm2c.iauctb.ac.ir/article_663720_6a00cedc563dbd4cbf3740983dbeadfa.pdf
Islamic Azad University, Central tehran Branch
International Journal of Mathematical Modelling & Computations
2228-6225
2228-6233
7
4 (FALL)
2017
11
01
The Tau-Collocation Method for Solving Nonlinear Integro-Differential Equations and Application of a Population Model
265
276
EN
Atefeh
Armand
Dep. Math, Yadegar imam khomeini (rah) shahre Rey, IAU
atefeh.armand@ymail.com
Zienab
Gouyandeh
Dep. Math, Najaf Abad, IAU
zgouyandeh@yahoo.com
This paper presents a computational technique that called Tau-collocation method for the developed solution of non-linear integro-differential equations which involves a population model. To do this, the nonlinear integro-differential equations are transformed into a system of linear algebraic equations in matrix form without interpolation of non-poly-nomial terms of equations. Then, using collocation points, we solve this system and obtain the unknown coefficients.<br /> To illustrate the ability and reliability of the method some nonlinear integro-differential equations and population models are presented. The results reveal that the method is very effective and simple.
Nonlinear integro-differential equation,Tau-Collocation method,Matrix representation,Population model,Collocation point
http://ijm2c.iauctb.ac.ir/article_663721.html
http://ijm2c.iauctb.ac.ir/article_663721_353c22ebe2793b8fbeb23498bb5e8212.pdf
Islamic Azad University, Central tehran Branch
International Journal of Mathematical Modelling & Computations
2228-6225
2228-6233
7
4 (FALL)
2017
11
01
Numerical Solution of Nonlinear PDEs by Using Two-Level Iterative Techniques and Radial Basis Functions
277
285
EN
Sara
Hosseini
Qazvin Branch, Islamic Azad University
s_hosseini66@yahoo.com
Radial basis function method has been used to handle linear and<br /> nonlinear equations. The purpose of this paper is to introduce the method of RBF to<br /> an existing method in solving nonlinear two-level iterative<br /> techniques and also the method is implemented to four numerical<br /> examples. The results reveal that the technique is very effective<br /> and simple. The main property of the method lies in its<br /> flexibility and ability to solve nonlinear equations accurately<br /> and conveniently.
First-order evolution equations,Two-level iterative techniques,Radial basis function,Newton's method for nonlinear equations
http://ijm2c.iauctb.ac.ir/article_663722.html
http://ijm2c.iauctb.ac.ir/article_663722_85f8d1cd2ae961e6b1660c564c8fb4fc.pdf
Islamic Azad University, Central tehran Branch
International Journal of Mathematical Modelling & Computations
2228-6225
2228-6233
7
4 (FALL)
2017
11
01
Solving Differential Equations by Using a Combination of the First Kind Chebyshev Polynomials and Adomian Decomposition Method
287
297
EN
hasan
barzegar kelishami
Department of Mathematics&lrm;, &lrm;Islamic Azad University&lrm;, &lrm;Central Tehran Branch&lrm;, &lrm;Tehran&lrm;, &lrm;Iran
hbk.math@gmail.com
In this paper, we are going to solve a class of ordinary diﬀerential equations that its source term are rational functions. We obtain the best approximation of source term by Chebyshev polynomials of the ﬁrst kind, then we solve the ordinary diﬀerential equations by using the Adomian decomposition method
Polynomials Chebyshev,Adomian decomposition method,Initial value problems,Best polynomial approximation
http://ijm2c.iauctb.ac.ir/article_663723.html
http://ijm2c.iauctb.ac.ir/article_663723_ad2ef8504ccc52c51015209991a03290.pdf
Islamic Azad University, Central tehran Branch
International Journal of Mathematical Modelling & Computations
2228-6225
2228-6233
7
4 (FALL)
2017
11
01
Approximation of a Fuzzy Function by Using Radial Basis Functions Interpolation
299
307
EN
Reza
Firouzdor
university
r.firouzdor2016@gmail.com
Majid
Amirfakhrian
IAUCTB
majiamir@yahoo.com
In the present paper, Radial Basis Function interpolations are applied to approximate a fuzzy function<br /> $tilde{f}:Rrightarrow mathcal{F}(R)$,<br /> on a discrete point set $X={x_1,x_2,ldots,x_n}$, by a fuzzy-valued function $tilde{S}$. RBFs are based on linear combinations of terms which include a single univariate function. Applying RBF to approximate a fuzzy function, a linear system will be obtained which by defining coefficient vector, target function will be approximated. Finally for showing the efficiency of the method we give some numerical examples.
Radial Basis Function interpolation,fuzzy function,fuzzy-valued function,an approximation of a fuzzy function
http://ijm2c.iauctb.ac.ir/article_663724.html
http://ijm2c.iauctb.ac.ir/article_663724_ce48161f971bb5d8d6495499424c47cf.pdf