On an operational method of solving initial-value problems for partial differential equations induced by generalized separation of variables

Kalenyuk, P. І.; Nytrebych, Zinovii

doi:10.1007/bf02364928

Cited by 15 publications

(5 citation statements)

References 9 publications

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“…To solve the problem, it is appropriate to apply a differential-symbol method. Note that a given method has been effectively used earlier to solve similar problems with linear conditions based on the selected time variable (under initial conditions in [40,41], integral conditions in [42], the Dirichlet conditions in [43], and local two-point conditions in [44,45]).…”

Section: Literature Review and Problem Statementmentioning

confidence: 99%

Analytical method to study a mathematical model of wave processes under twopoint time conditions

Nytrebych

Ільків

Пукач

et al. 2019

EEJET

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Adequate mathematical modeling of wave processes in oscillatory systems plays an important role in modern approaches to solving a series of scientific and engineering tasks, which arise in the problems on analysis, synthesis, and optimization of parameters for machine-building structures. Mathematical and numerical modelling are important in understanding the essence of phenomena and processes that are studied in modern mechanics and physics. Considering the adequacy of mathematical models and methods of analysis contributes to the interpretation of existing, as well as prediction and discovery of new, phenomena. Modern industrial equipment is operated in a wide range of parameters, particularly at high speeds, high pressures and energies, etc. The specified reasons necessitate the study and analysis

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Section: Literature Review and Problem Statementmentioning

confidence: 99%

Analytical method to study a mathematical model of wave processes under twopoint time conditions

Nytrebych

Ільків

Пукач

et al. 2019

EEJET

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“…Variation of functional of operation by Hamilton-Ostrogradsky's may be determined either in a conventional way according to [1], [4], [5] or using Lagrange theory, more precisely Euler-Lagrange'a equation [6], which simplifies calculations.…”

Section: Mathematical Model Of the Systemmentioning

confidence: 99%

“…In consequence, in order to complete the above described assignment a comprehensive interdisciplinary knowledge in three scientific fields is required: electrical engineering, applied mechanics and hydrodynamics. For aforementioned complex systems it is recommended to apply interdisciplinary modelling methods, which significantly expands research capabilities [1], [5]. This method uses modified integral Hamilton-Ostrogradsky's principle by expanding Lagrange function with two components: dispersion forces energy and non-potential energy of external forces.…”

Section: Introductionmentioning

confidence: 99%

The mathematical model of the drive system with asynchronous motor and vertical pump

Łukasik¹

2018

ELECTROTECHNICAL REVIEW

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The mathematical model of electric drive, which consists of deep groove asynchronous motor that rotates the axial pump, is substantiated, using the interdisciplinary modeling method, based on the modified Hamilton-Ostrogradsky's principle by expanding the known Lagrange function. Resulting differential equations are represented in normal Cauchy form and are integrated numerically. Streszczenie. W pracy na podstawie interdyscyplinarnej metody modelowania, która opiera się na zmodyfikowanej zasadzie Hamiltona-Ostrogradskiego z uwzględnieniem rozszerzenia funkcji Lagrange'a opracowano model matematyczny układu napędowego, który składa się z głębokożłobkowego silnika asynchronicznego sprzęgniętego z pompą pionową. Równania różniczkowe stanu elektromechanicznego przedstawione są w postaci normalnej Cauchy'ego, które całkowane są za pomocą metod numerycznych. (Model matematyczny układu napędowego z silnikiem asynchronicznym i pompą pionową).

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“…According to the differential-symbol method (see [7,13]), the partial solution of equation (1.1) can be found by the formula…”

Section: Introductionmentioning

confidence: 99%

The differential-symbol method of constructing the quasipolynomial solutions of two-point in time problem for nonhomogeneous partial differential equation

Nytrebych¹,

Маланчук²,

Ільків³

et al. 2019

Turk J Math

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The existence of the solution of nonhomogeneous partial differential equations (PDE) of second order in time and finite or infinite order in spatial variable with quasipolynomial right-hand side is proved. This solution satisfies the homogeneous two-point in time conditions. The differential-symbol method for constructing the solution of the problem is proposed. The examples of applying this method for solving some two-point problems for PDE are suggested.

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On an operational method of solving initial-value problems for partial differential equations induced by generalized separation of variables

Cited by 15 publications

References 9 publications

Analytical method to study a mathematical model of wave processes under twopoint time conditions

Analytical method to study a mathematical model of wave processes under twopoint time conditions

The mathematical model of the drive system with asynchronous motor and vertical pump

The differential-symbol method of constructing the quasipolynomial solutions of two-point in time problem for nonhomogeneous partial differential equation

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On an operational method of solving initial-value problems for partial differential equations induced by generalized separation of variables

Cited by 15 publications

References 9 publications

Analytical method to study a mathematical model of wave processes under two­point time conditions

Analytical method to study a mathematical model of wave processes under two­point time conditions

The mathematical model of the drive system with asynchronous motor and vertical pump

The differential-symbol method of constructing the quasipolynomial solutions of two-point in time problem for nonhomogeneous partial differential equation

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Analytical method to study a mathematical model of wave processes under twopoint time conditions

Analytical method to study a mathematical model of wave processes under twopoint time conditions