فهرست مطالب

بین المللی محاسبات و مدل سازی ریاضی - سال هفتم شماره 2 (Spring 2017)

مجله بین المللی محاسبات و مدل سازی ریاضی
سال هفتم شماره 2 (Spring 2017)

  • تاریخ انتشار: 1396/04/18
  • تعداد عناوین: 6
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  • Hosein jalebbonab, Hojatollah Adibi * Pages 93-106
    In this article a modification of the Chebyshev collocation method is applied to the solution of space fractional differential equations.The fractional derivative is considered in the Caputo sense.The finite difference scheme and Chebyshev collocation method are used .The numerical results obtained by this way have been compared with other methods.The results show the reliability and efficiency of the proposed method.
    Keywords: Fractional diffusion equation, Caputo derivative, Fractional Riccati differential equation, Finite difference, Collocation, Chebyshev polynomials
  • Bahram Agheli *, Abdolali Neamaty, Mehdi Nategh, Dumitru Baleanu Pages 107-113
    In this work, a non-integer order Airy equation involving Liouville differential operator is considered. Proposing an undetermined integral solution to the left fractional Airy differential equation, we utilize some basic fractional calculus tools to clarify the closed form.
    A similar suggestion to the right FADE, converts it into an equation in the Laplace domain.
    An illustration to the approximation and asymptotic behavior of the integral solution to the left FADE with respect to the existing parameters is presented.
    Keywords: Fractional Calculus, Liuville differential operator, Airy function, Fractional Airy equation
  • ANUJ KUMAR *, MANJU AGARWAL Pages 115-128
    In this paper, effect of alternative resource for top predator in food chain model with holling type III functional response is seen . Proposed model is demonstrated in respect of analytical as well numerical results. Bifurcation study with the variation of alternative resource and half saturation constants are done numerically. Simulation results shows that suitable alternative resource has the capability to prevent top predator extinction.
    Keywords: Mathematical Model, stability analysis, Holling type III Functional Response, Alternative Resource
  • Convection in a Tilted Square Enclosure with Various Boundary Conditions and Having Heat Generating Solid Body at its Center
    Periyasamy Umadevi *, Nagarajan Nithyadevi Pages 129-143
    In this study free convection flow and heat transfer of a fluid inside a tilted square enclosure having heat conducting and generating solid body positioned in the center of the enclosure with various thermal boundary conditions has been investigated numerically. The governing equations are transformed into non-dimensional form and the resulting partial differential equations are solved by Finite Volume Method applying power-law scheme using SIMPLE algorithm with Under-Relaxation technique. The parameters leading the problem are the aspect ratio, thermal conductivity ratio, temperature difference ratio and the angle of inclination. The effect of different thermal boundary conditions on streamlines and isotherms as well as on the rate of heat transfer on all walls of the enclosure are presented graphically.
    Keywords: Finite volume method, Aspect Ratio, Angle of Inclination, Natural convection, Square Enclosure
  • Mohammed waziri Yusuf * Pages 145-157
    Nonlinear conjugate gradient method is well known in solving large-scale unconstrained optimization problems due to it’s low storage requirement and simple to implement. Research activities on it’s application to handle higher dimensional systems of nonlinear equations are just beginning. This paper presents a Threeterm Conjugate Gradient algorithm for solving Large-Scale systems of nonlinear equations by incoporating the hyperplane projection and Powel restart approach. We prove the global convergence of the proposed method with a derivative free line search under suitable assumtions. the numerical results are presented which show that the proposed method is promising.
    Keywords: Unconstrained optimization, systems of nonlinear equations, Conjugate gradient, Derivative free line saerch
  • A. Zakeri *, Soheila Bodaghi Pages 159-173
    The present essay scrutinizes the application of discrete mollification as a filtering procedure to solve a nonlinear backward inverse heat conduction problem in one dimensional space. These problems are seriously ill-posed. So, we combine discrete mollification and space marching method to address the ill-posedness of the proposed problem. Moreover, a proof of stability and convergence of the aforementioned algorithm is provided. Finally, the results of this paper have been illustrated by some numerical examples.
    Keywords: Nonlinear backward inverse heat conduction problem, Discrete mollification, Space marching method, Stability, Convergence