Dr. Jafar  Biazar
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Dr. Jafar Biazar

Assistant Professor
University of Guilan, Iran


Highest Degree
Ph.D. in Numerical Analysis from Kharazmi University, Iran

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Biography

Dr. Jafar Biazar is presently working as Assistant Professor of Applied Mathematics at University of Guilan, Iran. His highest degree is PhD in Applied Mathematics. His Main Area of Interest is in Numerical Analysis and Numerical solution of functional equations. He has published more than 66 national/ international research articles in journals.

Area of Interest:

Mathematics
100%
Numerical Analysis
62%
Integral Equations
90%
Applied Mathematics
75%
Operation Research
55%

Research Publications in Numbers

Books
0
Chapters
0
Articles
0
Abstracts
0

Selected Publications

  1. Lichae, B.H., J. Biazar and Z. Ayati, 2019. The fractional differential model of HIV-1 infection of CD4+ T-Cells with description of the effect of antiviral drug treatment. Comp. Math. Meth. Med., Vol. 2019. 10.1155/2019/4059549.
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  2. Biazar, J. and R. Montazeri, 2019. Optimal homotopy asymptotic and multistage optimal homotopy asymptotic methods for solving system of volterra integral equations of the second kind. J. Appl. Math., Vol. 2019. 10.1155/2019/3037273.
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  3. Biazar, J. and K. Sadri, 2019. Solution of weakly singular fractional integro-differential equations by using a new operational approach. J. Comp. Appl. Math., 352: 453-477.
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  4. Lichae, B.H., J. Biazar and Z. Ayati, 2018. A class of runge-kutta methods for nonlinear volterra integral equations of the second kind with singular kernels. Adv. Difference Equat., Vol. 2018. 10.1186/s13662-018-1811-8.
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  5. Ilie, M., J. Biazar and Z. Ayati, 2018. The first integral method for solving some conformable fractional differential equations. Opt. Quantum Electron., Vol. 50. 10.1007/s11082-017-1307-x.
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  6. Ilie, M., J. Biazar and Z. Ayati, 2018. Resonant solitons to the nonlinear Schrödinger equation with different forms of nonlinearities. Optik, 164: 201-209.
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  7. Ilie, M., J. Biazar and Z. Ayati, 2018. Analytical study of exact traveling wave solutions for time-fractional nonlinear Schrödinger equations. Opt. Quantum Electron., Vol. 50. 10.1007/s11082-018-1682-y.
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  8. Biazar, J. and M.B. Mehrlatifan, 2018. A compact finite difference scheme for reaction -convection-diffusion equation. Chiang Mai J. Sci., 45: 1559-1568.
  9. Biazar, J., A. Aasaraai and M.B. Mehrlatifan, 2017. A compact scheme for a partial integro-differential equation with weakly singular kernel. J. Sci. Islamic Republic Iran, 28: 359-367.
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  10. Biazar, J. and M. Hosami, 2017. An interval for the shape parameter in radial basis function approximation. Appl. Math. Comp., 315: 131-149.
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  11. Biazar, J. and K. Hosseini, 2017. An effective modification of adomian decomposition method for solving emden-fowler type systems. National Acad. Sci. Lett., 40: 285-290.
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  12. Biazar, J. and M. Hosami, 2016. Selection of an interval for variable shape parameter in approximation by radial basis functions. Adv. Numer. Anal., Vol. 2016. 10.1155/2016/1397849.
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  13. Biazar, J. and K. Hosseini, 2016. A modified Adomian decomposition method for singular initial value Emden-Fowler type equations. Int. J. Appl. Math. Res., 5: 69-72.
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  14. Biazar, J. and F. Salehi, 2016. Chebyshev Galerkin method for integro-differential equations of the second kind. Iran. J. Num. Anal. Optim., 6: 31-43.
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  15. Biazar, J., M.B. Mehrlatifan, 2015. First integral method for systems of (1+1)-dimensional dispersive long wave. Walailak J. Sci. Technol., 12: 933-939.
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  16. Biazar, J., M.A. Asadi, 2015. Galerkin RBF for integro-differential equations. Br. J. Math. Comput. Sci., 11: 1-9.
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  17. Biazar, J., M.A. Asadi and F. Salehi, 2015. Rational homotopy perturbation method for solving stiff systems of ordinary differential equations. Appl. Math. Modell., 39: 1291-1299.
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  18. Biazar, J., F. Goldoust and F. Mehrdoust, 2015. On the numerical solutions of heston partial differential equation. Math. Sci. Lett., 4: 1-6.
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  19. Biazar, J. and T. Houlari, 2015. Implementation of sinc-galerkin on parabolic inverse problem with unknown boundary‎ condition‎. Int. J. Indus. Math., 7: 313-319.
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  20. Biazar, J. and M.A. Asadi, 2015. RBFs for integral equations with a weakly singular kernel. Am. J. Appl. Math., 3: 250-255.
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  21. Biazar, J. and M.A. Asadi, 2015. Indirect RBF for high-order integro-differential equations. J. Adv. Math. Comp. Sci., 11: 1-16.
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  22. Biazar, J. and M.A. Asadi, 2015. FD-RBF for partial integro-differential equations with a weakly singular kernel. Appl. Comput. Math., 4: 445-451.
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  23. Biazar, J. and M. Hosami, 2015. Redistribution of nodes with two constraints in Meshless method of line to time-dependent partial differential equations. Int. J. Differ. Equations, Vol. 2015. 10.1155/2015/762034.
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  24. Biazar, J. and M. Hosami, 2015. An adaptive meshless method of line based on radial basis functions. Iran. J. Numer. Anal. Optim., 5: 45-58.
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  25. Biazar, J. and M. Didgar, 2015. Numerical solution of Riccati equations by the Adomian and asymptotic decomposition methods over extended domains. Int. J. Differ. Equations, Vol. 2015. 10.1155/2015/580741.
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  26. Ayati, Z., J. Biazar and M. Partovi, 2015. Homotopy perturbation method for ozone decomposition of the second order in aqueous solutions. J. Appl. Math. Stat. Inf., 11: 63-72.
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  27. Ayati, Z. and J. Biazar, 2015. On the convergence of homotopy perturbation method. J. Egypt. Math. Soci., 23: 424-428.
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  28. Eslami, M. and J. Biazar, 2014. Analytical solution of the Klein-Gordon equation by a new homotopy perturbation method. Comput. Math. Model., 25: 124-134.
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  29. Biazar, J., Z. Ayati and S. Shahbazi, 2014. Solution of the burgers equation by the method of lines. Am. J. Numer. Anal., 2: 1-3.
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  30. Biazar, J., S.M. Kang and A. Rafiq, 2014. Reconsideration on “An improvement to the fixed point iterative method”. Nonlinear Anal. Forum, 19: 247-251.
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  31. Biazar, J., M.B. Mehrlatifan and Z. Salehdirin, 2014. The investigation of exact solutions for the appropriate type of the dispersive long wave equation. ISRN Math. Phys., Vol. 2014. 10.1155/2014/967176.
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  32. Biazar, J., F. Goldoust and F. Mehrdoust, 2014. On pricing European options under HCIR model: A comparative study. Adv. Model. Optim., 16: 523-531.
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  33. Biazar, J. and M. Hosami, 2014. Two efficient approaches based on radial basis functions to nonlinear time-dependent partial differential equations. J. Math. Comp. Sci., 9: 1-11.
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  34. Biazar, J. and M. Hosami, 2014. An easy trick to a periodic solution of relativistic harmonic oscillator. J. Egypt. Math. Soci., 22: 45-49.
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  35. Ayati, Z., J. Biazar and S. Zareii, 2014. Implementation of adomian polynomials in variational iteration method for solving volterra integral equations. Global J. Math. Anal., 2: 156-159.
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  36. Ayati, Z., J. Biazar and S. Ebrahimi, 2014. A new homotopy perturbation method for solving linear and nonlinear Schrödinger equations. J. Interpolation. Approximation Scient. Comp., 2014: 1-8.
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  37. Ayati, Z., J. Biazar and B. Gharedaghi, 2014. The application of modified homotopy analysis method for solving linear and non-linear inhomogeneous klein-gordon equations. Acta Univ. Apulensis, 39: 31-40.
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  38. Ayati, Z. and J. Biazar, 2014. Modification of the homotopy perturbation method and it's convergence. Walailak J. Sci. Technol., 11: 633-642.
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  39. Elzaki, T.M. and J. Biazar, 2013. Homotopy perturbation method and Elzaki transform for solving system of nonlinear partial differential equations. World Appl. Sci. J., 24: 944-948.
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  40. Derakhsh, P.S. and J. Biazar, 2013. The existence of noise terms for systems of partial differential and integral equations with (HPM) method. Math. Stat., 1: 113-118.
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  41. Biazar, J., Z. Ayati and M. Partovi, 2013. Homotopy perturbation method for biological species living together. Int. J. Appl., 2: 44-48.
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  42. Biazar, J. and Z. Ayati, 2013. G’/G-Expansion method for related equations to the Zhiber-Shabat equation. Global J. Math. Anal., 1: 97-103.
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  43. Biazar, J. and M. Hosami, 2013. Homotopy analysis method for an epidemic model. Walailak J. Sci. Technol., 11: 191-200.
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  44. Biazar, J. and M. Hosami, 2013. A modified homotopy perturbation method to periodic solution of a coupled integrable dispersionless equation. J. Math. Model., 1: 68-75.
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  45. Biazar, J. and M. Eslami, 2013. A new technique for non-linear two-dimensional wave equations. Sci. Iran., 20: 359-363.
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  46. Biazar, J. and M. Barandkam, 2013. The homogeneneous balance method and its application to the Swift-Hohenberg equation. Int. J. Appl. Math. Res., 2: 8-15.
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  47. Biazar, J. and F. Goldoust, 2013. Wavelet-Galerkin method and some numerical method for lane-emden type differential equation. Am. J. Appl. Math. Stat., 1: 83-86.
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  48. Biazar, J. and F. Goldoust, 2013. HPM and ADM for partial differential equations. Int. J. Appl. Math. Res., 2: 310-316.
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  49. Ayati, Z. and J. Biazar, 2013. Application of...-expansion method to two concert problems. Int. J. Appl. Math. Res., 2: 49-54.
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  50. Hosseini, K., J. Biazar, R. Ansari and P. Gholamin, 2012. A new algorithm for solving differential equations. Math. Meth. Appl. Sci., 35: 993-999.
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  51. Biazar, J., M. Eslami and M.R. Islam, 2012. Differential transform method for special systems of integral equations. J. King Saud Univ. Sci., 24: 211-214.
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  52. Biazar, J. and Z. Ayati, 2012. Exp and modified exp function methods for nonlinear Drinfeld-Sokolov system. J. King Saud Univ. Sci., 24: 315-318.
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  53. Biazar, J. and Z. Aslanpanah, 2012. The first integral method for the generalized drinfel’d–sokolov–wilson system and bretherton equation. Int. J. Appl., 1: 634-642.
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  54. Biazar, J. and Z. Aslanpanah, 2012. First integral method for the klein-gordon and korteweg-de vries equations. J. Nat. Sci. Sust. Technol., 6: 115-124.
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  55. Biazar, J. and T. Rahimi, 2012. Differential transform method for the solution of the lake pollution problem. J. Nat. Sci. Sust. Technol., 6: 103-113.
  56. Biazar, J. and M. Eslami, 2012. Approximate solutions for Fornberg-Whitham type equations. Int. J. Numer. Meth. Heat Fluid Flow, 22: 803-812.
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  57. Biazar, J. and M. Eslami, 2012. Application of NHPM for solving Helmholtz equation. Int. J. Comp. Sci. Math., 3: 367-375.
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  58. Biazar, J. and M. Eslami, 2012. A new method for solving the hyperbolic telegraph equation. Comput. Math. Model., 23: 519-527.
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  59. Biazar, J. and M. Barandkam, 2012. Differential transformation method for the model of human tcell lymphotropic virus iinfection of CD4+ TCells. J. Nat. Sci. Sust. Technol., 6: 315-323.
  60. Biazar, J. and H. Ebrahimi, 2012. Chebyshev wavelets approach for nonlinear systems of Volterra integral equations. Comp. Math. Applic., 63: 608-616.
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  61. Biazar, J. and H. Ebrahimi, 2012. A new technique for systems of Abel-Volterra integral equations. Int. J. Phys. Sci., 7: 89-99.
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  62. Biazar, J. and B. Ghanbari, 2012. The homotopy perturbation method for solving neutral functional-differential equations with proportional delays. J. King Saud Univ. Sci., 24: 33-37.
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  63. Biazar, J. and B. Ghanbari, 2012. HAM solution of some initial value problems arising in heat radiation equations. J. King Saud Univ. Sci., 24: 161-165.
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  64. Ayati, Z. and J. Biazar, 2012. New technique to solve nonlinear differential-difference systems. World Appl. Sci. J., 19: 823-827.
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  65. Biazara, J., R. Ansarib, K. Hosseinic and P. Gholaminc, 2011. Obtaining D’Alembert’s wave formula from variational iteration and homotopy perturbation methods. Math. Sci. Q. J., 5: 75-86.
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  66. Biazar, J., R. Ansari, K. Hosseini and M. Aligoli, 2011. Homotopy perturbation method for solving linear and non-linear systems of PDEs. J. Nat. Sci. Sustainable Technol., 4: 185-196.
  67. Biazar, J., M.G. Porshokouhi, B. Ghanbari and M.G. Porshokouhi, 2011. Numerical solution of functional integral equations by the variational iteration method. J. Comp. Appl. Math., 235: 2581-2585.
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  68. Biazar, J., K. Sadria and H. Ebrahimib, 2011. Variational iteration method and pade approximation for solving a model for htlv-i infection of CD4+TCells.. Nat. Sci. Sustainable Technol., 5: 175-187.
  69. Biazar, J., B. Ghanbari, M.G. Porshokouhi and M.G. Porshokouhi, 2011. He’s homotopy perturbation method: a strongly promising method for solving non-linear systems of the mixed Volterra–Fredholm integral equations. Comp. Math. Appl., 61: 1016-1023.
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  70. Biazar, J. and Z. Ayati, 2011. Improved G'/G-expansion method and comparing with tanh-coth method. Applic. Applied Mathe., 6: 1981-1991.
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  71. Biazar, J. and S.E. Dezhpasand, 2011. HAM for solution of the prey and predator problem. Int. J. Nonlinear Sci., 11: 68-73.
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  72. Biazar, J. and M. Eslami, 2011. Modified HPM for solving systems of Volterra integral equations of the second kind. J. King Saud Univ. Sci., 23: 35-39.
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  73. Biazar, J. and M. Eslami, 2011. Homotopy perturbation and taylor series for volterra integral equations of the second kind. Middle East J. Sci. Res., 7: 604-609.
  74. Biazar, J. and M. Eslami, 2011. Differential transform method for nonlinear fractional gas dynamics equation. Int. J. Phys. Sci., 6: 1207-1212.
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  75. Biazar, J. and M. Eslami, 2011. Differential transform method for nonlinear fractional gas dynamics equation. Int. J. Phys. Sci., 6: 1203-1206.
  76. Biazar, J. and M. Eslami, 2011. A reliable algorithm for solving nonlinear Jaulent-Miodek equation. J. King Saud Uni. Sci., 23: 133-137.
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  77. Biazar, J. and M. Eslami, 2011. A new homotopy perturbation method for solving systems of partial differential equations. Comp. Math. Appl., 62: 225-234.
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  78. Biazar, J. and H. Ebrahimi, 2011. Existence and uniqueness of the solution of Volterra integral equations by using Variational Iteration Method. J. Nat. Sci. Sustainable Technol., 5: 150-161.
  79. Biazar, J. and H. Ebrahimi, 2011. A strong method for solving systems of integro-differential equations. Appl. Math., 2: 1105-1113.
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  80. Biazar, J. and B. Ghanbari, 2011. Some higher-order families of methods for finding simple roots of nonlinear equations. Gen. Math. Notes, 7: 25-32.
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  81. Biazar, J. and B. Ghanbari, 2011. A new analytical approach for solving nonlinear boundary value problems in finite domains. Appl. Math., 2: 987-992.
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  82. Biazar, J., Z. Ayati and M.R. Yaghouti, 2010. Homotopy perturbation method for homogeneous Smoluchowsk's equation. Numer. Meth. Partial Differ. Equations, 26: 1146-1153.
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  83. Biazar, J., P. Gholamin and K. Hosseini, 2010. Variational iteration method for solving Fokker–Planck equation. J. Franklin Inst., 347: 1137-1147.
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  84. Biazar, J., M.G. Porshokuhi and B. Ghanbari, 2010. Extracting a general iterative method from an adomian decomposition method and comparing it to the variational iteration method. Comput. Math. Applic., 59: 622-628.
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  85. Biazar, J., M.G. Parashkohi and H. Ebrahimi, 2010. Variational iteration method for linear and nonlinear systems of integro-differential equations. Int. Math. Forum, 5: 3327-3333.
  86. Biazar, J., M. Shahbala and H. Ebrahimi, 2010. VIM for solving the pollution problem of a system of lakes. J. Cont. Sci. Eng., Vol. 2010. 10.1155/2010/829152.
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  87. Biazar, J., M. Partovi, Z. Ayati, 2010. Approximating solutions for ginzburg–landau equation by HPM and ADM. Applic. Applied Math.: Int. J., 5: 1672-1681.
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  88. Biazar, J., M. Eslami and M.R. Islam, 2010. Differential transform method for nonlinear parabolic-hyperbolic partial differential equations. Applic. Applied Math.: Int. J., 5: 1493-1503.
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  89. Biazar, J. and Z. Ayati, 2010. Application of exp‐function method to EW‐burgers equation. Numer. Meth. Partial Differ. Equations, 26: 1476-1482.
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  90. Biazar, J. and Z. Ayati, 2010. A maple program for the second kind of volterra integral equations by homotopy perturbation method. Intl. Math. Forum, 5: 3323-3326.
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  91. Biazar, J. and S. Niroomand, 2010. An analytic approximation to the solution of elliptic equations and comparing the results with crank-nicolson method. Int. J. Contemp. Math. Sci., 5: 1193-1199.
  92. Biazar, J. and S. Alizadeh, 2010. Homotopy perturbation method for parabolic equations. J. Nat. Sci. Sustainable Technol., 4: 143-145.
  93. Biazar, J. and S. Alizadeh, 2010. Decomposition of source terms in homotopy perturbation method. Nonlinear Sci. Lett. A, 1: 403-408.
  94. Biazar, J. and M.G. Porshokouhi, 2010. Application of variational iteration method for linear and nonlinear integrodifferential-difference equations. Int. Math. Forum, 5: 3335-3341.
  95. Biazar, J. and M.G. Porshokouhi, 2010. Application of variational iteration method for convection-diffusion equations. Int. Math. Forum, 5: 3327-3333.
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  96. Biazar, J. and M. Eslami, 2010. Exact solutions for non-linear Volterra-Fredholm integro-differential equations by he’s homotopy perturbation method. Int. J. Nonlinear Sci., 9: 285-289.
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  97. Biazar, J. and M. Eslami, 2010. Differential transform method for systems of Volterra integral equations of the first kind. Nonlinear Sci. Lett. A, 1: 173-181.
  98. Biazar, J. and M. Eslami, 2010. Differential transform method for solving Helmholtz equation. World Appl. Sci. J., 10: 166-168.
  99. Biazar, J. and M. Eslami, 2010. Differential transform method for quadratic Riccati differential equation. Int. J. Nonlinear Sci., 9: 444-447.
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  100. Biazar, J. and M. Eslami, 2010. Analytic solution for Telegraph equation by differential transform method. Phys. Lett. A, 374: 2904-2906.
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  101. Biazar, J. and M. Eslami, 2010. An efficient technique for solving special integral equations. Applic. Applied Math.: Int. J., 5: 217-224.
  102. Biazar, J. and M. Eslami, 2010. Acceleration of the convergence of He’s homotopy perturbation method for solving Fredholm integral equations of the second kind. J. Adv. Res. Applied Mathe., 2: 58-67.
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  103. Biazar, J. and H. Ebrahimi, 2010. Legendre wavelets for systems of Fredholm integral equations of the second kind. World Appl. Sci. J., 9: 1008-1012.
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  104. Biazar, J. and H. Ebrahimi, 2010. Existence and uniqueness of the solution of non-linear systems of Volterra integral equations of the second kind. J. Adv. Res. Appl. Math., 2: 39-51.
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  105. Biazar, J. and F. Mohammadi, 2010. Application of differential transform method to the sine-gordon equation. Int. J. Nonlinear Sci., 10: 190-195.
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  106. Biazar, J. and F. Mohammadi, 2010. Application of differential transform method to the generalized Burgers-Huxley equation. Applic. Applied Mathe., 5: 1726-1740.
  107. Biazar, J. and B. Ghanbari, 2010. A new third-order family of nonlinear solvers for multiple roots. Comput. Math. Appl., 59: 3315-3319.
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  108. Ayati, Z. and J. Biazar, 2010. Application of exp-function method to the (2+1)-dimensional calogero bogoyavlanskii schiff equation. Iran. J. Opti., 2: 174-193.
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  109. Aminikhah, H. and J. Biazar, 2010. Exact solutions of systems of linear integro-differential equations using the HPM. Int. J. Nonlinear Sci., 9: 285-289.
  110. Aminikhah, H. and J. Biazar, 2010. A new analytical method for system of ODEs. Numer. Meth. Partial Differ. Equations, 26: 1115-1124.
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  111. Aminikhah, H. and J. Biazar, 2010. A new analytical method for solving systems of volterra integral equations. Int. J. Comput. Math., 87: 1142-1157.
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  112. Aminikhah, H. and J. Biazar, 2010. A new HPM for ordinary differential equations. Numer. Methods Partial Differ. Equ., 26: 480-489.
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  113. Yusufoglu, E., 2009. An improvement to homotopy perturbation method for solving system of linear equations. Comput. Math. Appl., 58: 2231-2235.
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  114. Biazar, J., Z. Ayati and H. Ebrahimi, 2009. New solitonary solutions for modified equal-width wave equations using Exp-function method. Int. J. Nonlinear Dyn. Eng. Sci., 1: 109-114.
  115. Biazar, J., Z. Ayati and H. Ebrahimi, 2009. Homotopy perturbation method for general form of porous medium equation. J. Porous Media, 12: 1121-1127.
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  116. Biazar, J., M. Eslami and H. Aminikhah, 2009. Application of homotopy perturbation method for systems of Volterra integral equations of the first kind. Chaos, Solitons Fractals, 42: 3020-3026.
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  117. Biazar, J., M. Eslami and H. Aminikhah, 2009. Application of homotopy perturbation method for systems of Volterra integral equations of the first kind. Chaos Solitons Fractals, 42: 2597-3246.
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  118. Biazar, J., H. Ghazvini and M. Eslami, 2009. He’s homotopy perturbation method for systems of integro-differential equations. Chaos, Solitons Fractals, 39: 1253-1258.
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  119. Biazar, J., H. Ebrahimi and Z. Ayati, 2009. An approximation to the solution of telegraph equation by variational iteration method. Numer. Methods Partial Differ. Equations, 25: 797-801.
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  120. Biazar, J., F. Badpeima and F. Azimi, 2009. Application of the homotopy perturbation method to Zakharov–Kuznetsov equations. Comp. Math. Applic., 58: 2391-2394.
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  121. Biazar, J., F. Badpeima and F. Azimi, 2009. Application of the homotopy perturbation method to Zakharov�Kuznetsov equations. Comput. Math. Appl., 58: 2391-2394.
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  122. Biazar, J. and Z. Ayati, 2009. Extension of the exp-function method for systems of two-dimensional burgers equations. Comput. Math. Appl., 58: 2103-2106.
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  123. Biazar, J. and S. Bozorgi, 2009. An approximation to the solution of beam equation by Trigonometric methods. J. Nat. Sci. Sustainable Technol., 4: 263-267.
  124. Biazar, J. and H. Ghazvini, 2009. He’s homotopy perturbation method for solving systems of Volterra integral equations of the second kind. Chaos, Solitons Fractals, 39: 770-777.
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  125. Biazar, J. and H. Ghazvini, 2009. Exact solutions for nonlinear burgers' equation by homotopy perturbation method. Numer. Meth. Partial Differ. Equations, 25: 833-842.
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  126. Biazar, J. and H. Ghazvini, 2009. Convergence of the homotopy perturbation method for partial differential equations. Nonlinear Anal. Real World Appli., 10: 2633-2640.
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  127. Biazar, J. and H. Ebrahimi, 2009. Variational iteration method for fredholm integral equations of the second kind. Iran. J. Optim., 1: 13-23.
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  128. Biazar, J. and H. Aminikhah, 2009. Study of convergence of homotopy perturbation method for systems of partial differential equations. Comput. Math. Appl., 59: 2221-2230.
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  129. Biazar, J. and H. Aminikhah, 2009. Exact and numerical solutions for non-linear Burger’s equation by VIM. Math. Comp. Model., 49: 1394-1400.
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  130. Biazar, J. and H. Aminikhah, 2009. A new technique for solving nonlinear integral-differential-Equations. Comput. Math. Applied., 58: 2084-2090.
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  131. Biazar, J. and B. Ghanbari, 2009. A modification on Newton’s method for solving systems of non-linear equations. World Acad. Sci., Eng. Technol., 3: 841-845.
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  132. Aminikhah, H. and J. Biazar, 2009. Exact solution for high-order integro-differential equations by NHPM. Int. J. Nonlinear Sci., 7: 496-500.
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  133. Naresh, R., A. Tripathi, J. Biazar and D. Sharma, 2008. Analysis of the effect of vaccination on the spread of AIDS epidemic using Adomian Decomposition method. J. Nat. Sci. Sust. Technol., 2: 183-213.
  134. Biazar1 J. and S. Bozorgi, 2008. Exact solutions of some hyperbolic equations with initial conditions. Int. J. Contemp. Math. Sci., 3: 745-751.
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  135. Biazar, J., Z. Ayati and H. Ebrahimi, 2008. Comparing Homotopy perturbation method and Adomian decomposition method. AIP Conf. Proc., Vol. 1048. 10.1063/1.2991054.
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  136. Biazar, J., R. Ansari, K. Hosseini and P. Gholamin, 2008. Solution of the linear and non-linear schrödinger equations using homotopy perturbation and adomian decomposition methods. Int. Math. Forum, 3: 1891-1897.
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  137. Biazar, J., M. Eslami and H. Ghazvini, 2008. Exact solutions for systems of volterra integral equations of the first kind by homotopy perturbation method. Appl. Mathe. Sci., 2: 2691-2697.
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  138. Biazar, J., K. Hosseini and P. Gholamin, 2008. Homotopy perturbation method Fokker-Planck equation. Int. Math. Forum, 3: 945-954.
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  139. Biazar, J., P. Gholamin and K. Hosseini, 2008. Variational iteration and adomian decomposition methods for solving kawahara and modified kawahara equations. Applied Math. Sci., 2: 2705-2712.
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  140. Biazar, J. and Z. Ayati, 2008. Application of the Exp-function method to the equal-width wave equation. Phys. Scr., Vol. 78. 10.1088/0031-8949/78/04/045005.
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  141. Biazar, J. and H. Ghazvini, 2008. Numerical solution for special non-linear Fredholm integral equation by HPM. Appl. Math. Comput., 195: 681-687.
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  142. Biazar, J. and H. Ghazvini, 2008. An analytical approximation to the solution of a wave equation by a variational iteration method. Appl. Math. Lett., 21: 780-785.
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  143. Biazar, J. and H. Ghazvini, 2008. Homotopy perturbation method for solving hyperbolic partial differential equations. Comput. Math. Appli., 56: 453-458.
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  144. Biazar, J. and F. Azimi, 2008. He’s homotopy perturbation method for solving Helmholtz equation. Int. J. Contemp. Math. Sci., 3: 739-744.
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  145. Biazar, J. and B. Ghanbary, 2008. A new technique for solving systems of nonlinear equations Applied Math. Sci., 2: 2699-2703.
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  146. Biazar, J. and B. Ghanbary, 2008. A new approach for solving systems of nonlinear equations. Int. Math. Forum, 3: 1885-1889.
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  147. Biazar, J. and B. Ghanbari, 2008. A new computational approach for nonlinear equations. Int. Math. Forum, 3: 955-960.
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  148. Taheri, S.H., H. Ghazvini, J. Saberi-Nadjafi and J. Biazar, 2007. A hybrid of the restarted Arnoldi and electromagnetism meta-heuristic methods for calculating eigenvalues and eigenvectors of a non-symmetric matrix. Appl. Math. Comp., 191: 79-88.
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  149. Rahman, M.A., S. Mustafiz, J. Biazar, M. Koksal and M.R. Islam, 2007. Investigation of a novel perforation technique in petroleum wells-perforation by drilling. J. Franklin Inst., 344: 777-789.
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  150. Duan, J., J. An and M. Xu, 2007. Solution of system of fractional differential equations by Adomian decomposition method. Appl. Math. A J. Chin. Univ., 22: 7-12.
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  151. Biazar, J.A.N. and H. Ghazvini, 2007. Exact solutions for non-linear Schrödinger equations by He's homotopy perturbation method. Phys. Lett. A, 366: 79-84.
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  152. Biazar, J., M. Eslami and H. Ghazvini, 2007. Homotopy perturbation method for systems of partial differential equations. Int. J. Nonlinear Sci. Numer. Simul., 8: 413-418.
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  153. Biazar, J. and Z. Ayati, 2007. An approximation to the solution of the Brusselator system by Adomian decomposition method and comparing the results with Runge-Kutta method. Int. J. Contemp. Math. Sciences, 2: 983-989.
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  154. Biazar, J. and M. Pourabd, 2007. A maple program for solving systems of linear and nonlinear integral equations by adomian decomposition method. Int. J. Contemp. Math. Sci., 2: 1425-1432.
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  155. Biazar, J. and H. Ghazvini, 2007. Solution of the wave equation by homotopy perturbation method. Int. Math. Forum, 2: 2237-2244.
    Direct Link  |  
  156. Biazar, J. and H. Ghazvini, 2007. He’s variational iteration method for solving linear and non-linear systems of ordinary differential equations. Appl. Math. Comp., 191: 287-297.
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  157. Biazar, J. and H. Ghazvini, 2007. He’s variational iteration method for fourth-order parabolic equations. Comp. Math. Applic., 54: 1047-1054.
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  158. Biazar, J. and H. Ghazvini, 2007. He's variational iteration method for solving hyperbolic differential equations. Intl. J. Nonlinear Sci. Numer. Simul., 8: 311-314.
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  159. Biazar, J. and H. Ebrahimi, 2007. An Approximation to the solution of telegraph equation by adomian decomposition method. Int. Math. Forum, 2: 2231-2236.
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  160. Biazar, J. and A. Ranjbar, 2007. A comparison between newton’s method and ADM for Solving special fredholm integral equations. Int. Math. Forum, 2: 215-222.
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  161. Biazar, J. and S.m. Shafiof, 2007. A simple algorithm for calculating adomian polynomials. Int. J. Contemp. Math. Sci., 2: 975-982.
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  162. Biazar J. and Z. Ayati, 2007. A numerical solution of reaction-diffusion Brusselator system by A.D.M. J. Nature Sci. Sustainable Technol., 1: 263-270.
  163. Biazar, J., R. Agha and I. MR, 2006. The Adomian decomposition method for the solution of the transient energy equation in rocks subjectedto laser irradiation. Iran. J. Sci. Technol. Trans. A: Sci., 30: 201-212.
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  164. Biazar, J., M. Tango and R. Islam, 2006. Ozone decomposition of the second order in aqueous solutions. Appl. Math. Comput., 177: 220-225.
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  165. Biazar, J., M. Ilie and A. Khoshkenar, 2006. An improvement to an alternate algorithm for computing Adomian polynomials in special cases. Appl. Math. Comp., 173: 582-592.
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  166. Biazar, J., L. Farrokhi and M.R. Islam, 2006. Modeling the pollution of a system of lakes. Applied Math. Comput., 178: 423-430.
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  167. Biazar, J., 2006. Solution of the epidemic model by Adomian decomposition method. Applied Mathematics Computation, 173: 1101-1106.
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  168. Biazar, J. and Z. Ayati, 2006. An approximation to the solution of parabolic equation by Adomian decomposition method and comparing the result with Crank-Nicolson method. Int. Math. Forum, 1: 1925-1933.
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  169. Biazar, J. and M. Pourabd, 2006. A maple program for computing adomian polynomials. Int. Math. Forum, 1: 1919-1924.
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  170. Biazar, J. and H. Ebrahimi, 2006. An approximation to the solution of Klein-Gordon equation with initial or boundary value condition. Int. Math. Forum, 1: 1433-1439.
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  171. Biazar, J. and A. Amirteimoori, 2006. An improvement to the fixed point iterative method. Applied Math. Comput., 182: 567-571.
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  172. Biazar, J., M. Ilie and A. Khoshkenar, 2005. A new approach to the solution of the prey and predator problem and comparison of the results with the Adomian method. Appl. Math. Comp., 171: 486-491.
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  173. Biazar, J., 2005. Solution of systems of integral-differential equations by Adomian decomposition method. Appl. Math. Comp., 168: 1232-1238.
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  174. Biazar, J. and R. Montazeri, 2005. A computational method for solution of the prey and predator problem. Appl. Math. Comp., 163: 841-847.
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  175. Biazar, J. and H. Ebrahimi, 2005. An approximation to the solution of hyperbolic equations by Adomian decomposition method and comparison with characteristics method. Appl. Math. Comp., 163: 633-638.
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  176. Biazar, J. and A.R. Amirtaimoori, 2005. An analytic approximation to the solution of heat equation by Adomian decomposition method and restrictions of the method. Applied Math. Comput., 171: 738-745.
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  177. Babolian, E. and J. Biazar, 2005. Solution of heat equation with nonlinear and nonlocal boundary conditions by adomian decomposition method. Southeast Asian Bull. Math., 29: 1045-1051.
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  178. Biazar, J., E. Babolian and R. Islam, 2004. Solution of the system of ordinary differential equations by adomian decomposition method. Applied Math. Comput., 147: 713-719.
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  179. Biazar, J. and R. Islam, 2004. Solution of wave equation by Adomian decomposition method and the restrictions of the method. Appl. Mathe. Comp., 149: 807-814.
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  180. Babolian, E., J. Biazar and A.R. Vahidi, 2004. The decomposition method applied to systems of Fredholm integral equations of the second kind. Appl. Math. Comp., 148: 443-452.
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  181. Babolian, E., J. Biazar and A.R. Vahidi, 2004. Solution of a system of nonlinear equations by Adomian decomposition method. Appl. Math. Comp., 150: 847-854.
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  182. Babolian, E., J. Biazar and A.R. Vahidi, 2004. On the decomposition method for system of linear equations and system of linear Volterra integral equations. Appl. Math. Comp., 147: 19-27.
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  183. Babolian, E., J. Biazar and A.R. Vahidi, 2004. A new computational method for Laplace transforms by decomposition method. Appl. Math. Comp., 150: 841-846.
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  184. Biazar, J., M. Tango, E. Babolian and R. Islam, 2003. Solution of the kinetic modeling of lactic acid fermentation using Adomian decomposition method. Applied Math. Comput., 144: 433-439.
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  185. Biazar, J., E. Babolian, G. Kember, A. Nouri and R. Islam, 2003. An alternate algorithm for computing Adomian polynomials in special cases. Appl. Math. Comp., 138: 523-529.
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  186. Biazar, J., E. Babolian and R. Islam, 2003. Solution of a system of Volterra integral equations of the first kind by Adomian method. Appl. Math. Comp., 139: 249-258.
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  187. Babolian, E., and J. Biazar, 2003. Solving concrete examples by Adomian method. Appl. Math. Comp., 135: 161-167.
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  188. Babolian, E. and J. Biazar, 2002. Solving the problem of biological species living together by Adomian decomposition method. Appl. Math. Comp., 129: 339-343.
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  189. Babolian, E. and J. Biazar, 2002. Solution of nonlinear equations by modified Adomian decomposition method. App. Math. Comp., 132: 167-172.
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  190. Babolian, E. and J. Biazar, 2002. On the order of convergence of adomian method. Applied Math. Comput., 130: 383-387.
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  191. Babolian, E. and J. Biazar, 2000. Solution of a system of nonlinear Volterra integral equations of the second kind. Far East J. Math. Sci., 2: 935-946.