اساتید
    نام استاد : علی شکری

    گروه آموزشی : ریاضی
    واحد سازمانی : رئیس دانشکده
    درجه علمی : دانشیار
    دروس تدریسی : ...
    شروع به خدمت : 1389
    تحصیلات : دکترا
    رشته تحصیلی : ریاضی کاربردی- آنالیز عددی
    محل تحصیل : دانشگاه تبریز
    تاریخ تولد : 1359
    خط داخلی :
    تلفن :
    فاکس :
    موبایل :
    ایمیل فرستنده :
    توضیحات : با سلام و عرض خیر مقدم.
    تاریخ بروزرسانی : 1396/03/30
     
      Title of Thesis Name of Student
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    1.  
    A hybrid conjugate gradient method with descent property for unconstrained optimization Mohammad Irandokht University of Maragheh February 2017
    1.  
    New step lengths in conjugate gradient methods
     
    Fatemeh Ghasemi Tabegh University of Payame Noor Tabriz February 2017
    1.  
    A predictor-corrector explicit four-step method with vanished phase-lag and its first,second and third derivatives for the numerical integration of the schrodinger equation Leila Ghorbanian University of Maragheh September 2016
    1.  
    A family of explicit linear six-step methods with vanished phase-lag and its first derivative. Zohreh Karami University of Maragheh September 2016
    5 Two-step high order hybrid explicit method for the numerical solution of the Schrödinger equation Bita Parvizi Milani University of Maragheh February 2016
    6 New high order multiderivative explicit four-step methods with vanished phase-lag and its derivatives for the approximate solution of the Schrödinger Roghaye Norouzi University of Maragheh September 2015
    7 An explicit four-step method with vanished phase-lag and its first and second derivatives Azar Noshadi University of Maragheh April 2015
    1.  
    A two-step explicit P-stable method of high phase-lag order for linear periodic IVPs Khadijeh Alizadeh University of Payame Noor Tabriz February 2015
    9 Two optimized symmetric eight-step implicit methods for initial-value problems with oscillating solutions Fahimeh Javadi University of Maragheh August 2014
    1.  
    A family of high-order multistep methods with vanished phase-lag and its derivatives for the numerical solution of the Schrödinger equation Shabnam Mostafavi University of Maragheh August 2014
    1.  
    A symmetric eight-step predictor-corrector method for the numerical solution of the radial Schrodinger equation and related IVPs with oscillating solutions Hosein Saadat University of Maragheh
    •  
    1.  
    About a numerical method successive interpolations for functional Hammerestein integral equations Maryam Sadigh University of Maragheh October 2014
    1.  
    Optimization as a function of the phase-lag order of nonlinear explicit two-step P-stable method for linear periodic IVPs Nader Dorosti University of Payame Noor Tabriz February 2013
     
    1.  
    A nonlinear explicit two-step fourth algebraic order method of order infinity for linear periodic initial value problems Mohsen Moradi University of Maragheh October 2013
    1.  
    An Improved Mixed Conjugate Gradient Method Ebrahim Esmailpour University of Maragheh September 2013
    1.  
    Fast enclosure for solutions in underdetermined systems Mohammad Cheraghi University of Maragheh July 2013
    1.  
    The Feasibility of the Inverse maximum flow problems and flowmodification techniques in the case of non-feasibility Fatemeh Ahmadkhanpour Islamic Azad University, Hamedan Science and Research Branch September 2013
    1.  
    Exponentially and Trigonometrically Fitted Methods for the Solution of the Schrodinger Equation. Hakimeh Yari University of Maragheh October 2013
    1.  
    A parametric symmetric linear four-step method for the efficient integration of the Schrödinger equation and related oscillatory problems Ali Amjad University of Maragheh October 2012
    1.  
    A new linearization method for generalized linear multiplicative programming Shiva Hasanpour Islamic Azad University, Hamedan Science and Research Branch August 2012
    1.  
    Determining Type II sensitivity ranges of the fractional assignment problem
     
    Nahideh Afifi Bavil Islamic Azad University, Hamedan Science and Research Branch August 2012
    1.  
    Class 2+1 hybrid BDF-Like methods for the numerical solutions of ordinary differential equations Farideh Rajabi University of Maragheh In Progress
    1.  
    High algebraic order Runge–Kutta type two-step method with vanished phase-lag and its first, second, third, fourth, fifth and sixth derivatives Arezoo Shoghi University of Maragheh In Progress
    1.  
    A class of multistep methods based on a super-future points technique for solving IVPs Leila Zafaranloo University of Maragheh In Progress
    1.  
    Hybrid BDF methods for the numerical solution of ordinary differential equations Mehri Hemmatifar University of Maragheh In Progress