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A Study on Particular Solutions of Coupled PDE System

Explore particular solutions of coupled PDE systems, focusing on Chebyshev polynomials and splines, with numerical examples and innovative techniques like Hörmander Operator Decomposition. Discover active research fields and applications in engineering problems.

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A Study on Particular Solutions of Coupled PDE System

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  1. A Study on Particular Solutions of Coupled PDE System Chia-Cheng Tasi 蔡加正 Department of Information Technology Toko University, Chia-Yi County, Taiwan

  2. Overview Motivation and Introduction Method of Particular Solutions (MPS) Particular solutions of Chebyshev polynomials Numerical example I Particular solutions of spline Numerical example II Conclusions

  3. 陳建宏 柯永澤 陳柏台 辛敬業 劉德源 張建仁 林俊華 系工 系工 系工 系工 系工 系工 電機 尹 彰 周宗仁 林炤圭 蕭松山 岳景雲 翁文凱 臧效義 河工 河工 河工 河工 河工 河工 河工 You are Welcome ! 機械 河工 河工 機械 郭世榮 葉為忠 曹登皓 范佳銘 劉進賢 陳正宗 河工 河工 河工 河工 NTOU is a Kingdom of BEM

  4. Motivation and Introduction Boundary-type numerical method: BEM, Treffz method, MFS Advantage: Reduction of dimensionalities Disadvantage: Domain integration => the method of particular solutions (MPS) or the dual reciprocity method (DRM) Active research fields of BEM: Singularity and Domain integration

  5. Motivation and Introduction

  6. Motivation and Introduction

  7. Motivation and Introduction BIEM Innovation Hypersingularity DBEM MPS MRM How to prove? Application

  8. Motivation and Introduction RBF Golberg (1995) Chebyshev MPS with Chebyshev Polynomials exponential convergence MFS Golberg, M.A.; Muleshkov, A.S.; Chen, C.S.; Cheng, A.H.-D. (2003)

  9. Motivation and Introduction

  10. Method of particular solutions

  11. Method of particular solutions Method of particular solutions Method of fundamental solutions, Trefftz method, boundary element method, et al.

  12. Method of particular solutions (basis functions)

  13. Method of particular solutions Coupled PDE system Hörmander operator decomposition technique Product operator Partial fraction decomposition Polyharmonic operator Poly-Helmholtz operator ? Generating theorem Laplacian operator Helmholtz operator

  14. Method of particular solutions (Hörmander Operator Decomposition technique) Particular solutions for the engineering problems

  15. Example

  16. Example

  17. Other examples Stokes flow Thermal Stokes flow

  18. Other examples Thick plate Solid deformation

  19. Remark Particular solutions for product operator Particular solutions for engineering problems Hörmander operator decomposition technique

  20. Method of particular solutions (Partial fraction decomposition) Particular solutions for Particular solutions for product operator Partial fraction decomposition

  21. Partial fraction decomposition (Theorem)

  22. Partial fraction decomposition (Proof 1)

  23. Partial fraction decomposition (Proof 2)

  24. Example (1)

  25. Example (2)

  26. Remark Partial fraction decomposition

  27. Particular solutions of Chebyshev polynomials (why orthogonal polynomials) Fourier series: exponential convergence but Gibb’s phenomena Lagrange Polynomials: Runge phenomena Chebyshev Polynomials (one of the orthogonal polynomials): exponential convergence

  28. Chebyshev interpolation (1)

  29. Chebyshev interpolation (2)

  30. Chebyshev interpolation (3)

  31. Chebyshev interpolation (4)

  32. Particular solutions of Chebyshev polynomials

  33. Particular solutions of Chebyshev polynomials

  34. Particular solutions of of Chebyshev polynomials (Generating Theorem)

  35. Particular solutions of of Chebyshev polynomials (Generating Theorem)

  36. Particular solutions of of Chebyshev polynomials (Generating Theorem)

  37. Particular solutions of Chebyshev polynomials (poly-Helmholtz) Generating Theorem Golberg, M.A.; Muleshkov, A.S.; Chen, C.S.; Cheng, A.H.-D. (2003)

  38. Particular solutions of Chebyshev polynomials (polyharmonic)

  39. Particular solutions of Chebyshev polynomials (polyharmonic)

  40. Fig. 2: Geometry configuration of the MFS. Method of fundamental solutions

  41. Method of fundamental solutions (example)

  42. Numerical example I Example (2D modified Helmholtz)

  43. Numerical example I Example (2D Laplace)

  44. Numerical example I Example (3D modified Helmholtz)

  45. Numerical example I Example (3D Laplace)

  46. Numerical example I Example (2D polyharmonic)

  47. Numerical example I Example (2D product operator)

  48. Fig. 1: Geometric configuration of the Ressiner plate model. Numerical example I Example (Reissner plate)

  49. Example (Reissner plates: particular solutions)

  50. Example (Reissner plates: particular solutions)

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