Islamic Azad University, Central tehran BranchInternational Journal of Mathematical Modelling & Computations2228-622564 (FALL)20161101Generalization of Titchmarsh's Theorem for the Dunkl Transform261267527655ENSalahEl OuadihuniversityRadouanDaher.Journal Article20160727Using a generalized spherical mean operator, we obtain a generalization of Titchmarsh's<br /> theorem for the Dunkl transform for functions satisfying the ('; p)-Dunkl Lipschitz condition<br /> in the space Lp(Rd;wl(x)dx), 1 < p 6 2, where wl is a weight function invariant under the<br /> action of an associated re<br /> ection group.http://ijm2c.iauctb.ac.ir/article_527655_655da811be873f72c62568a902f95d08.pdfIslamic Azad University, Central tehran BranchInternational Journal of Mathematical Modelling & Computations2228-622564 (FALL)20161101Estimates for the Generalized Fourier-Bessel Transform in the Space L2269275527656ENSalahEl OuadihuniversityJournal Article20161013Some estimates are proved for the generalized Fourier-Bessel transform in the space (L^2) (alpha,n)-index<br /> certain classes of functions characterized by the generalized continuity modulus.http://ijm2c.iauctb.ac.ir/article_527656_5bc418dd1e7d38a4c143a52f8db4139b.pdfIslamic Azad University, Central tehran BranchInternational Journal of Mathematical Modelling & Computations2228-622564 (FALL)20161101Common Fixed-Point Theorems For Generalized Fuzzy Contraction Mapping277284527657ENHamidMottaghi GolshanDepartment of Mathematics, Lorestan University, P. O. Box 465, Khoramabad, IranJournal Article20161013In this paper we investigate common xed point theorems for contraction mapping in fuzzy<br /> metric space introduced by Gregori and Sapena [V. Gregori, A. Sapena, On xed-point the-<br /> orems in fuzzy metric spaces, Fuzzy Sets and Systems, 125 (2002), 245-252].http://ijm2c.iauctb.ac.ir/article_527657_e7a5558b4b2d31afed9ff7008e0ad355.pdfIslamic Azad University, Central tehran BranchInternational Journal of Mathematical Modelling & Computations2228-622564 (FALL)20161101An Lp-Lq-version Of Morgan's Theorem For The Generalized Fourier Transform Associated with a Dunkl Type Operator285290527658ENLoualidEl MehdiuniversityJournal Article20161023The aim of this paper is to prove new quantitative uncertainty principle for the generalized<br /> Fourier transform connected with a Dunkl type operator on the real line. More precisely we<br /> prove An Lp-Lq-version of Morgan's theorem.http://ijm2c.iauctb.ac.ir/article_527658_b67f1b2b988a3c047f4f06910e7c53db.pdfIslamic Azad University, Central tehran BranchInternational Journal of Mathematical Modelling & Computations2228-622564 (FALL)20161101An efficient method for the numerical solution of Helmholtz type general two point boundary value problems in ODEs291299527659ENPramodPandeyuniversityJournal Article20161027In this article, we propose and analyze a computational method for numerical solution of general two point boundary value problems. Method is tested on problems to ensure the computational eciency. We have compared numerical results with results obtained by other method in literature. We conclude that propose method is computationally ecient and eective.http://ijm2c.iauctb.ac.ir/article_527659_c97fa5ec91bb5202976c89b818f0ae88.pdfIslamic Azad University, Central tehran BranchInternational Journal of Mathematical Modelling & Computations2228-622564 (FALL)20161101The combined reproducing kernel method and Taylor series for solving nonlinear Volterra-Fredholm integro-differential equations301312527660ENAzizallahAlvandiDASDDADAAASMahmoudParipourDepartment of Mathematics, Hamedan University of Technology,
Hamedan, 65156-579, IranJournal Article20161023In this letter, the numerical scheme of nonlinear Volterra-Fredholm integro-differential equations is proposed in a reproducing kernel Hilbert space (RKHS). The method is constructed based on the reproducing kernel properties in which the initial condition of the problem is satised. The nonlinear terms are replaced by its Taylor series. In this technique, the nonlinear Volterra-Fredholm integro-differential equations are converted to nonlinear differential equations. The exact solution is represented in the form of series in the reproducing Hilbert kernel space. The approximation solution is expressed by n-term summation of reproducing kernel functions and it is converge to the exact solution. Some numerical examples are given to show the accuracy of the method.http://ijm2c.iauctb.ac.ir/article_527660_149531c82f6fbfa92aad9f8f2fa2d8d3.pdf