研究生：陳佳聰指導教授：陳正宗　教授　　　　　陳義麟　副教授

Null-field integral equation approach for Helmholtz (interior and exterior acoustic) problems with circular boundaries 研究生：陳佳聰指導教授：陳正宗　教授　　　　　陳義麟　副教授國立台灣海洋大學河海工程學系結構組碩士班論文口試日期: 2005/06/16 13:30-15:00 MSVLAB

Outlines • Motivation • Literature review • Present method • Scattering problems in full and half planes • Alternative derivation of the semi-circular canyon subject to the SH waves • Numerical examples-membrane vibration • Numerical examples-exterior acoustics • Special case for Laplace problem • Conclusions MSVLAB

Motivation Potential formulation Regular formulation Singularity and hypersingularity ‧ 1 1 Fictitious boundary (indirect BEM) 2 2 Null-field integral equation Conjunction with degenerate kernel Bump contour Null-field integral equation Collocation point C.P.V. and H.P.V. ill-posed ??? Regularization techniques MSVLAB

Outlines • Motivation • Literature review • Present method • The technique for solving scattering problems in full and half planes • Alternative derivation of the Trifunac’s solution • Numerical examples-membrane vibration • Numerical examples-exterior acoustic • Special case for Laplace problem • Conclusions MSVLAB

Spurious characteristic equation of BEM (abroad researcher) • Tai and Shaw 1974, De Mey 1976 (real-part or imaginary-part kernel) • Niwa et al. 1982 (Only complex-value kernel satisfies Green’s function) • Hutchinson 1985 (real-part kernel) • Kitahara 1985 (Spurious eigenvalues were found) • Chen and Hong1988 (Dual BEM) • Golub & Van 1989 (SVD updating terms) • Partridge 1992 (Dual reciprocity boundary element method) • Kamiya & Andoh 1993, Itagaki & Brebbia 1993, Nowak & Neves 1994 (Multiple reciprocity method) MSVLAB

Spurious characteristic equation of BEM (MSV LAB) • Huang 1999 (Dual multiple reciprocity method using the singular value decomposition technique, simply-connected domain) • Lin 2000 (BEM using Burton & Miller approach, multiply-connected domain) • Chang 2001 (MFS, simply-connected domain in three dimension) • Chen and Lin 2002 (BEM using CHEEF concept, multiply-connected domain) • Liu 2002 (BEM using SVD updating technique, multiply-connected domain, analytical solution for annular case) • Lee 2004 (MFS, multiply-connected domain ) • Highly precision of prediction in spurious eigenvalue?? MSVLAB

Successful experiences of spuriouseigenvalue (BEM) (Membrane) Simply-connected problem Multiply-connected problem (Membrane) MSVLAB

Fictitious frequency (abroad researcher) • Seybert and Rengarajan 1968 (CHIEF method) • Ohmatsu 1983 (Combined integral equation method (CIEM)) • Achenbach et al.1988 (Off-boundary approach to BEM) • Fancis 1989 (SVD technique to solve the electromangetic resonance problem) • Wu and Seybert 1991 (CHIEF-block method using the weighted residual formulation) • Lee and Wu 1993 (Enhanced CHIEF method) • Juhl 1994 and Poulin 1997 (combined the CHIEF method and SVD technique) • Dokumaci and Sarigül 1995 (Surface Helmholtz integral equation (SHIE) and CHIEF method for radiation problem of two spheres) MSVLAB

Fictitious frequency (MSV LAB) • Chen 2000 (Dual BEM conjunction with Burton & Miller method, simply-connected domain) • Chen 2002 (Dual BEM conjunction with CHIEF method, simply-connected domain) • Chen 2004 (Dual BEM conjunction with Fast Multipole expansion method(FMM), simply-connected domain) • Multiply-connected domain ???? MSVLAB

Outlines • Motivation • Literature review • Present method • scattering problems in full and half planes • Alternative derivation of the Trifunac’s solution • Numerical examples-membrane vibration • Numerical examples-exterior acoustic • Special case for Laplace problem • Conclusions MSVLAB

Governing equation Helmholtz equation D u : acoustic potential k : wave number, : angular frequency c : sound speed D : domain of interest :Laplacian operator D MSVLAB

Integral representation D D Dual integral equation formulation for domain point: Null-field integral equation formulation: singular formulation hyper-singular formulation u : acoustic potential t: the normal derivation of u U, T, L, M: kernel function D : domain of interest x x x x MSVLAB

U(s,x) T(s,x) L(s,x) M(s,x) The relation about the kernels MSVLAB

x s x s R O1 x O2 Degenerate kernel x (field point): variable s (source point): fixed r S O1 R O2 MSVLAB

Degenerate kernels Fundamental solution: Degenerate kernels: MSVLAB

Fourier series for boundary densities Fourier series: MSVLAB

Adaptive origin of observer x: collocation point . MSVLAB

Decomposition of gradient vector Angle derivative direction True normal direction Radial derivative direction x MSVLAB

2M+1 terms Collocation points By choosing M D.O.F. of Fourier series, we select 2M+1 collocation points on the circle. MSVLAB

Linear algebraic equation (Membrane vibration) fixed Routing boundary index Collocation circle index Routing boundary index MSVLAB

Linear algebraic equation (Membrane vibration) ● ● ● ● ● ● ● ● MSVLAB

Degenerate kernel Fourier series Potential Null-field equation Fourier Coefficients Analytical Algebraic equation AX=0 or AX=B Numerical The flowchart of present formulation Adaptive observer system, decomposition of gradient vector Collocation point method Integral equation for domain point SVD Inverse MSVLAB

Decomposition of scattering problem into incident wave field and radiation problem Incident SH-wave = (a) Incident wave field + Incident SH-wave (b) Radiation field MSVLAB

Image concept for solving the half-plane wave Image incident-SH wave Incident-SH wave take free body Incident-SH wave Incident-SH wave Incident-SH wave (a) Real problem (c) Transformed problem of full plane (b) Extended problem with artificial boundaries ( ) MSVLAB

Alternative derivation of the Trifunac solution by using the present method Reflected SH wave Incident SH wave MSVLAB

Alternative derivation of the Trifunac solution by using the present method Incident wave field: Expansion formula of Abramowitz and Stegan: Incident wave field : where Otherwise, The normal derivative of incident wave field: MSVLAB

Alternative derivation of the Trifunac solution by using the present method The radiation boundary condition: Fourier coefficients for : Substituting into null-field integral equation: Substituting into integral equation for domain point: The total displacement for the full plane: MSVLAB

The difference between present method and BEM MSVLAB

Problem statement Simply-connected domain Doubly-connected domain Multiply-connected domain MSVLAB

Mesh Collocation point Element (a) Present method (b) BEM (c) FEM MSVLAB

Example 1 MSVLAB

The eigenfrequencies by using singular equation M=6, 26 collocation points Contaminated by spurious eigenvalues MSVLAB

The eigenfrequencies by using hyper-singular equation M=6, 26 collocation points Contaminated by spurious eigenvalues MSVLAB

The spurious eigenvalues are filtered by Burton & Miller method Only true eigenvalues appear M=6, 26 collocation points MSVLAB

The former five true eigenvalues by using different approaches MSVLAB

The former five eigenmodes by using present method, FEM and BEM MSVLAB

Example 2 MSVLAB

The eigenfrequencies by using singular equation M=6, 26 collocation points Contaminated by spurious eigenvalues MSVLAB

The eigenfrequencies by using hyper-singular equation M=6, 26 collocation points Contaminated by spurious eigenvalues MSVLAB

The spurious eigenvalues are filtered by Burton & Miller method Only true eigenvalues appear M=6, 26 collocation points MSVLAB

The former five eigenvalues by using different approaches MSVLAB

The former five eigenmodes by using present method, FEM and BEM MSVLAB

Parserval sum (b) inner circle (real part) (a) outer circle (real part) Parserval sum Parserval sum M M MSVLAB

Example 3 R=1 c2=0.4 c1=0.3 e=0.5 MSVLAB

Extraction of the spurious eigenvalues by using SVD updating document M=3 MSVLAB

The former five eigenvalues by using different approaches MSVLAB

研究生：陳佳聰 指導教授：陳正宗 教授 陳義麟 副教授