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Parametric integral equations systems method in solving unsteady heat transfer problems for laser heated materials

Sawicki D., Zieniuk E.

Acta Mechanica et Automatica

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2015

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Vol. 9, no. 3

167--172

EN

One of the most popular applications of high power lasers is heating of the surface layer of a material, in order to change its properties. Numerical methods allow an easy and fast way to simulate the heating process inside of the material. The most popular numerical methods FEM and BEM, used to simulate this kind of processes have one fundamental defect, which is the necessity of discretization of the boundary or the domain. An alternative to avoid the mentioned problem are parametric integral equations systems (PIES), which do not require classical discretization of the boundary and the domain while being numerically solved. PIES method was previously used with success to solve steady-state problems, as well as transient heat transfer problems. The purpose of this paper is to test the efficacy of the PIES method with time discretization in solving problem of laser heating of a material, with different pulse shape approximation functions.

2

Shape identification in nonlinear boundary problems solved by pies method

Zieniuk E., Bołtuć A., Szerszeń K.

Acta Mechanica et Automatica

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2014

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Vol. 8, no. 1

16--21

EN

The paper presents the strategy for identifying the shape of defects in the domain defined in the boundary value problem modelled by the nonlinear differential equation. To solve the nonlinear problem in the iterative process the PIES method and its ad-vantages were used: the efficient way of the boundary and the domain modelling and global integration. The identification was performed using the genetic algorithm, where in connection with the efficiency of PIES we identify the small number of data required to the defect’s definition. The strategy has been tested for different shapes of defects.

3

PURC w rozwiązywaniu nieliniowych dwuwymiarowych zagadnień brzegowych

Zieniuk E., Szerszeń K.

Modelowanie Inżynierskie

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2009

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T. 6, nr 37

281-288

PL

W pracy zaprezentowano efektywne podejście służące do rozwiązywania nieliniowych zagadnień brzegowych oraz dokonano jego wstępnej weryfikacji. Za źródło nieliniowości przyjęto równanie różniczkowe, za pomocą którego modelowane są rozpatrywane zagadnienia. Na sukces przedstawianego algorytmu składa się: użycie metody PURC (z powodzeniem stosowanej do rozwiązywania zagadnień liniowych), zaproponowanie efektywnego sposobu obliczania całek po obszarach i wreszcie efektywnego sposobu definiowania tych obszarów.

EN

The paper presents an effective approach to solving nonlinear boundary problems and its initial verification. As a source of nonlinearity we have chosen a differential equation which model considered problems. A success of a presented idea is made by: using PIES method (which was successfully used for solving of linear problems), a proposed effective way of domain integrals computation and finally an effective way of definition of used domains.