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Nation Taiwan Ocean University Department of Harbor and River June 18, 2015 p. 1 Null-field equation approach as a tool for computing Green ’ s function for Laplace operator with circular holes and/or inclusions Jeng-Tzong Chen Taiwan Ocean University 6G-4, 11:00-11:20, April 6, 2007 ICCM 2007, Hiroshima, Japan (ICCM2007.ppt)
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 2 Outlines Motivation and literature review Derivation of the Green ’ s function Null-field integral approach to construct the Green ’ s function Expansion of kernel function and boundary density Adaptive observer system Linear algebraic equation Numerical examples Annular problem Eccentric ring A half -plane with an aperture (1) Dirichlet boundary (2) Robin boundary A half-plane problem with a circular hole and a half-circular inclusion Conclusions
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 3 Outlines Motivation and literature review Derivation of the Green ’ s function Null-field integral approach to construct the Green ’ s function Expansion of kernel function and boundary density Adaptive observer system Linear algebraic equation Numerical examples Annular problem Eccentric ring A half -plane with an aperture (1) Dirichlet boundary (2) Robin boundary A half-plane problem with a circular hole and a half-circular inclusion Conclusions
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 4 Motivation Green ’ s function has been studied and applied in many fields in recent years. For complicated domain, series form Green ’ s function as well as closed-form is not easy to obtain. To search a systematic method for Green ’ s function with several circular boundaries is not trivial.
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 5 Literature review Analycal Greeen ’ s function Jaswon and Symm (1977) Melnikov (1977) Numerical Greeen ’ s function Telles et al. (1995) Melnikov (2001)
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 6 Outlines Motivation and literature review Derivation of the Green ’ s function Null-field integral approach to construct the Green ’ s function Expansion of kernel function and boundary density Adaptive observer system Linear algebraic equation Numerical examples Annular problem Eccentric ring A half -plane with an aperture (1) Dirichlet boundary (2) Robin boundary A half-plane problem with a circular hole and a half-circular inclusion Conclusions
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 7 Null-field integral approach to construct the Green ’ s function Governing equation: Fundamental solution: Boundary condition: Governing equation: Original Problem Auxiliary system Green’s third identity BIE for Green’s function Subjected to given B. C.
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 8 Expansions of fundamental solution (2D) Laplace problem-- Where O s x x
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 9 Boundary density discretization Fourier series expansions - boundary density Fourier series Ex. constant element
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 10 Adaptive observer system Source point collocation point
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 11 Linear algebraic equation
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 12 Flowchart of present method Degenerate kernel Fourier series Null-field equation Algebraic system Fourier Coefficients Potential Analytical Numerical
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 13 Outlines Motivation and literature review Derivation of the Green ’ s function Null-field integral approach to construct the Green ’ s function Expansion of kernel function and boundary density Adaptive observer system Linear algebraic equation Numerical examples Annular problem Eccentric ring A half -plane with an aperture (1) Dirichlet boundary (2)Robin boundary A half-plane problem with a circular hole and a half-circular inclusion Conclusions
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 14 Annular problem subjected to a concentrated force a b 0u Degenerate kernel Fourier series 0u
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 15 Null-field integral equation
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 16 The explicit form for the unkown Fourier series can be obtained as
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 17 Analytic form for annular problem subjected to a concentrated force
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 18 Result of annular problem subjected to a concentrated force Green’s function for annular case M=50 (analytical solution) Green’s function for annular case M=50 (semi-analytical solution)
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 19 Outlines Motivation and literature review Derivation of the Green ’ s function Null-field integral approach to construct the Green ’ s function Expansion of kernel function and boundary density Adaptive observer system Linear algebraic equation Numerical examples Annular problem Eccentric ring A half -plane with an aperture (1) Dirichlet boundary (2) Robin boundary A half-plane problem with a circular hole and a half-circular inclusion Conclusions
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 20 Eccentric ring Present method Melnikov’s method Eccentric ring
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 21 Outlines Motivation and literature review Derivation of the Green ’ s function Null-field integral approach to construct the Green ’ s function Expansion of kernel function and boundary density Adaptive observer system Linear algebraic equation Numerical examples Annular problem Eccentric ring A half -plane with an aperture (1) Dirichlet boundary (2) Robin boundary A half-plane problem with a circular hole and a half-circular inclusion Conclusions
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 22 A Half plane with an aperture subjected to Dirichlet bound condition Present method Melnikov’s method Dirichlet bound condition
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 23 A Half plane with an aperture subjected to Robin bound condition Robin bound condition Melikov's approach Present method
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 24 Outlines Motivation and literature review Derivation of the Green ’ s function Null-field integral approach to construct the Green ’ s function Expansion of kernel function and boundary density Adaptive observer system Linear algebraic equation Numerical examples Annular problem Eccentric ring A half -plane with an aperture (1) Dirichlet boundary (2) Robin boundary A half-plane problem with a circular hole and a half-circular inclusion Conclusions
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 25 A half-plane problem with a circular hole and a half-circular inclusion Half -plane Inclusion Matrix A circular hole Source of Green’s function Material conductivity
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 26 A half plane →A full plane
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 27 Take free body Interface boundary
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 28 Linear algebraic equation where represent the material conductivity of matrix and inclusion, respectively. and
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 29 Result of a half-plane problem with a circular hole and a half-circular inclusion Contour plot by using the null-field integral equation approach Contour plot by using Melikov's approach (2006)
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 30 Outlines Motivation and literature review Derivation of the Green ’ s function Null-field integral approach to construct the Green ’ s function Expansion of kernel function and boundary density Adaptive observer system Linear algebraic equation Numerical examples Annular problem Eccentric ring A half -plane with an aperture (1) Dirichlet boundary (2) Robin boundary A half-plane problem with a circular hole and a half-circular inclusion Conclusions
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Mechanics Sound Vibration Laboratory HRE, NTOU http://ind.ntou.edu.tw/~msvlab/ June 18, 2015 p. 31 Conclusions A semi-analytical Green ’ s function was successfully derived using null-field integral equation. Several cases, including the annular, eccentric, half-plane problems with circular cavity as well as inclusion were demonstrated to show the validity of our formulation. A general-purpose program for constructing Green ’ s function of Laplace problems with circular boundaries was implemented.
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Nation Taiwan Ocean University Department of Harbor and River June 18, 2015 p. 32 Thanks your kind attentions You can get more information on our website. http://msvlab.hre.ntou.edu.tw/
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