Parabolic Boundary Value Problems in a Piecewise Homogeneous Wedge-Shaped Cylindrical-Circular Space with a Cavity

Parabolic Boundary Value Problems in a Piecewise Homogeneous Wedge-Shaped Cylindrical-Circular Space with a Cavity

By the method of integral and hybrid integral transforms, in combination with the method of main solutions (matrices of influence and Green matrices) the only exact analytical solutions of the parabolic boundary value problems of mathematical physics in a piecewise homogeneous wedge-shaped cylindric...

Повний опис

Збережено в:
Бібліографічні деталі
Дата:2018
Автори: Конет, Іван Михайлович, Пилипюк, Тетяна Михайлівна
Формат: Стаття
Мова:Ukrainian
Опубліковано: Кам'янець-Подільський національний університет імені Івана Огієнка 2018
Онлайн доступ:http://mcm-math.kpnu.edu.ua/article/view/159387
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Назва журналу:Mathematical and computer modelling. Series: Physical and mathematical sciences

Репозитарії

Mathematical and computer modelling. Series: Physical and mathematical sciences
Опис
Резюме:By the method of integral and hybrid integral transforms, in combination with the method of main solutions (matrices of influence and Green matrices) the only exact analytical solutions of the parabolic boundary value problems of mathematical physics in a piecewise homogeneous wedge-shaped cylindrical circular space with a cylindrical cavity were constructed for the first time.The cases of the Dirichlet and Neumann boundary conditions and their possible combinations (Dirichlet-Neumann, Neumann-Dirichlet) on the edges of the wedge are considered.The finite integral Fourier transform relative to the angular variable, Fourier integral transform on the Cartesian axis relative to the variable z and Weber-type hybrid integral transform on the polar axis with n conjugation points relative to the radial variable are used to construct solutions.The sequential application of integral transforms allows us to reduce the three-dimensional initial-boundary value problems to the Cauchy problem for the ordinary linear non-uniform differential equation of the 1st order, the only solution of which is written in a closed form.The use of inverse integral transforms restores the solutions of the considered problems in explicit form through their integral image.

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