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DSpace Ana Sayfası
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artan
azalan
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Toplam kayıt 122, listelenen: 120
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Yazar Adı
IAB, ADEL KHALED MOHAMED
[1]
Iahn, Roberta Cesarino
[1]
Ifigeneial, Vamvakidou
[1]
Iftekharuddin, Khan
[2]
II. Dünya Savaşı Öncesinde Türk Dış Politikası
[1]
Ildız, Gülce Öğrüç
[1]
Ilgar, Rüştü
[1]
Ilgın, Hicran Özlem
[2]
Ilias, Michailidis
[1]
Ilıcak  Aydınalp, Ş. Güzin
[1]
Ilıcak, Güzin
[1]
Ilıcak, Ş. Güzin
[1]
Ilıcak, Şükran Güzin
[1]
In the thesis, the theory of analytic and harmonic functions are taken up first. Then the socalled logharmonic functions are studied. Logharmonic functions are basically those complex mappings having a harmonic logarithm, and they are represented as a multiplication of an analytic and a coanalytic function. The subclass Slh(A;B) of logharmonic functions is introduced and studied. This is the subclass consisting of logharmonic functions whose analytic part is a Janowski starlike. It should be noted that it is also possible to obtain new results provided that the analytic part of a logharmonic function belongs to a wellknown class of analytic functions. Distortion theorems for the functions in Slh(A;B), as well as for their analytic and coanalytic parts, are obtained.MarxStrohhacker inequality and the radius of starlikeness for the class Slh(A;B) are derived. The Jacobian function and its distortion for the members of Slh(A;B) are obtained. Lastly, a coecient inequality is also obtained for the class Slh(A;B).
[1]
In this thesis the energy preserving average vector field (ABV) integrator was applied to the nonlinear Schrödinger (NLS) equation and the discretized model is reduced by proper orthogonal decomposition (POD).Numerical results for one and two dimensional NLS and coupled NLS with periodic and soliton solutions confirm the converge rates of the POD reduced model. The reduced model preserves the Hamiltonian structure and is also energy preserving for coupled NLS dispersion analysis was also carried out.
[1]
In this thesis, numerical solutions of fractional partial differential equations and system of fractional ordinary differential equations are considered. Nonpolynomial spline method and Galerkin finite element methods are applied for the equations above. Caputo fractional derivative is used for fractional derivative term. Taylor expansion is used to obtain M_i moments in spline method. In order to test accuracy of the spline method applied to fractional diffusion equation, numerical dispersion analysis is applied and useful results are obtained. It is concluded that in all the problems numerical results converge to the exact solutions when h goes to zero. It yields results compatible with the exact solutions and consistent with other existing numerical methods. Use of nonpolynomial splines and Galerkin method have shown that they are applicable methods for this type of equations.
[1]
Inanc, N.
[1]
Irani, Hoonaz Shamayi
[1]
Iranikhah, Sasan
[1]
Irmak, Onur
[1]
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