Solutions of initial and boundary value problems for inhomogeneous burgers equations with time-variable coefficients için kapak resmi
Solutions of initial and boundary value problems for inhomogeneous burgers equations with time-variable coefficients
Başlık:
Solutions of initial and boundary value problems for inhomogeneous burgers equations with time-variable coefficients
Yazar:
Bozacı, Aylin, author.
Yazar Ek Girişi:
Fiziksel Tanımlama:
vii, 91 leaves:+ 1 computer laser optical disc.
Özet:
In this thesis, we have investigated initial-boundary value problems on semiinfinite line for inhomogeneous Burgers equation with time-variable coecients. We have formulated the solutions for the cases with Dirichlet and Neumann boundary conditions. We showed that the Dirichlet problem for the variable parametric Burgers equation is solvable in terms of a linear ordinary dierential equation and a linear second kind singular Volterra integral equation. Then, for particular models with special initial and Dirichlet boundary conditions we found a class of exact solutions. Next, we considered the Neumann problem and showed that it reduces to a second order linear ordinary dierential equation and the standard heat equation with initial and nonlinear boundary conditions. Finally, we formulated the Cauchy problem for the variable parametric Burgers equation on the non-characteristic line, and obtained its solution in terms of a linear ODE and the series solution of the corresponding Cauchy problem for the heat equation. We gave examples to illustrate how some well known solutions of the Burgers equation can be recovered by solving a corresponding Cauchy problem.
Tek Biçim Eser Adı:
Thesis (Master)--İzmir Institute of Technology:Mathematics.

İzmir Institute of Technology:Mathematics--Thesis (Master).
Elektronik Erişim:
Access to Electronic Versiyon.
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