introduction of dual bem/biem and its engineering applications j t chen, distinguished prof
DESCRIPTION
INTRODUCTION OF DUAL BEM/BIEM AND ITS ENGINEERING APPLICATIONS J T Chen, Distinguished Prof. National Taiwan Ocean University MSVLAB Department of Harbor and River Engineering. Taiwan Ocean University June 07, 11:00-12:00, 2007 (city-London2007.ppt). Outlines. - PowerPoint PPT PresentationTRANSCRIPT
1
INTRODUCTION OF DUAL BEM/BIEM AND ITS ENGINEERING APPLICATIONS
J T Chen, Distinguished Prof.
Taiwan Ocean University
June 07, 11:00-12:00, 2007
(city-London2007.ppt)
National Taiwan Ocean University
MSVLABDepartment of Harbor and River
Engineering
2
Overview of BEM and dual BEM ( 中醫式的工程分析法 )
Mathematical formulation Hypersingular BIE Successful experiences
Nonuniqueness and its treatments Degenerate scale True and spurious eigensolution (interior prob.) Fictitious frequency (exterior acoustics)
Conclusions
Outlines
3
BEM USA (3569) , China (1372) , UK, Japan,
Germany, France, Taiwan (580), Canada, South Korea, Italy (No.7)
Dual BEM (Made in Taiwan) UK (124), USA (98), Taiwan (70), China
(46), Germany, France, Japan, Australia, Brazil, Slovenia (No.3)
(ISI information Apr.20, 2007)
Top ten countries of BEM and dual BEM
台灣加油 FEM Taiwan (No.9/1383)
4
FEM
USA(9946), China(4107), Japan(3519), France, Germany, England, South Korea, Canada, Taiwan(1383), Italy
Meshless methods
USA(297), China(179), Singapore(105), Japan(49), Spain, Germany, Slovakia, England, Portugal, Taiwan(28)
FDM
USA(4041), Japan(1478), China(1411), England, France, Canada, Germany, Taiwan (559), South Korea, India
(ISI information Apr.20, 2007)
Top ten countries of FEM, FDM and Meshless methods
5
BEM Aliabadi M H (UK, Queen Mary College) Chen J T (Taiwan, Ocean Univ.) 106 SCI papers Mukherjee S (USA, Cornell Univ.) Leisnic D(UK, Univ. of Leeds) Tanaka M (Japan, Shinshu Univ.) Dual BEM (Made in Taiwan) Aliabadi M H (UK, Queen Mary Univ. London) Chen J T (Taiwan, Ocean Univ.) Power H (UK, Univ. Nottingham) (ISI information Apr.20, 2007)
Top three scholars on BEM and dual BEM
NTOU/MSV 加油
6
Top 25 scholars on BEM/BIEM since 2001
北京清華姚振漢教授提供 (Nov., 2006)
NTOU/MSVTaiwan
7
Overview of numerical methods
Finite Difference M ethod Finite Element M ethod Boundary Element M ethod
M esh M ethods M eshless M ethods
Numerical M ethods
7
PDE- variational IEDE
Domain
BoundaryMFS,Trefftz method MLS, EFG
開刀 把脈
針灸
8
Number of Papers of FEM, BEM and FDM
(Data form Prof. Cheng A. H. D.)
126
9
Growth of BEM/BIEM papers
(data from Prof. Cheng A.H.D.)
10
Advantages of BEM
Discretization dimension reduction Infinite domain (half plane) Interaction problem Local concentration
Disadvantages of BEM Integral equations with singularity Full matrix (nonsymmetric)
北京清華
11
BEM and FEM
(1) BEM and meshless methods can be seen as a supplement of FEM.
(2) BEM utilizes the discretization concept of FEM as well as the limitation. Whether the supplement is needed or not depends on its absolutely superio
r area than FEM.
C rack & large scale problems
NTUCE
12
What Is Boundary Element Method ?
NTUCE
1 2
3
45
6
1 2
geometry nodethe Nth constantor linear element
N
西醫 郎中
13
Dual BEM
Why hypersingular BIE is required
(potential theory)
NTUCE
1 2
3
4
56
7
8
1 2
3
4
56
7
8
910
Artifical boundary introduced !
BEM
Dual integral equations needed !
Dual BEM
Degenerate boundary
14
Some researchers on Dual BEMChen(1986) 436 citings in total
Hong and Chen (1988 ) 74 citings ASCE
Portela and Aliabadi (1992) 188 citings IJNME
Mi and Aliabadi (1994)
Wen and Aliabadi (1995)
Chen and Chen (1995) 新竹清華黎在良等 --- 斷裂力學邊界數值方法 (1996)
周慎杰 (1999)
Chen and Hong (1999) 76 citings ASME AMR
Niu and Wang (2001)
Yu D H, Zhu J L, Chen Y Z, Tan R J …
NTUCE
cite
15
Dual Integral Equations by Hong and Chen(1984-1986)
NTUCE
Singular integral equation Hypersingular integral equation
Cauchy principal value Hadamard principal value
Boundary element method Dual boundary element method
normal
boundarydegenerate
boundary
1969 1986 2006
16
Degenerate boundary
geometry node
the Nth constantor linear element
un0
un0
un0
u 1 u 1(0,0)
(-1,0.5)
(-1,-0.5)
(1,0.5)
(1,-0.5)
1 2
3
4
56
7
8 [ ]{ } [ ]{ }U t T u
[ ]{ } [ ]{ }L t M u
N
1.693-0.335-019.0019.0445.0703.0445.0335.0
0.334-1.693-281.0281.0045.0471.0347.0039.0
0.0630.638-193.1193.1638.0063.0081.0081.0
0.0630.638-193.1193.1638.0063.0081.0081.0
0.4710.045-281.0281.0693.1335.0039.0347.0
0.7030.445019.0019.0335.0693.1335.0445.0
0.4710.347054.0054.0039.0335.0693.1045.0
0.335-0.039054.0054.0347.0471.0045.0693.1
][
U
-1.107464.0464.0219.0490.0219.0107.1
1.107-785.07854.0000.0588.0519.0927.0
0.8881.326326.1888.0927.0927.0
0.8881.326326.1888.0927.0927.0
0.5880.000785.0785.0107.1927.0519.0
0.4900.219464.0464.0107.1107.1219.0
0.5880.519321.0321.0927.0107.1000.0
1.1070.927321.0321.0519.0588.0000.0
][
T
5(+) 6(+) 5(+) 6(-)
5(+)6(+)
5(+)6(+)
n s( )
0.805464.0464.0612.0490.0612.0805.0
0.805347.0347.0000.0184.0519.0927.0
0.8881.417417.1888.0511.0511.0
0.888-1.417-417.1888.0511.0511.0
0.1840.000347.0347.0805.0927.0519.0
0.4900.612464.0464.0805.0805.0612.0
0.1840.519458.0458.0927.0805.0000.0
0.8050.927458.0458.0519.0184.0000.0
][
L
000.41.600-400.0400.0282.0235.0282.0600.1
1.600-000.4000.1000.1333.1205.0062.0800.0
0.715-3.765-000.8000.8765.3715.0853.0853.0
0.7153.765000.8000.8765.3715.0853.0853.0
0.205-1.333-000.1000.1000.4600.1800.0061.0
0.236-0.282-400.0400.0600.1000.4600.1282.0
0.205-0.061-600.0600.0800.0600.1000.4333.1
1.600-0.800-600.0600.0061.0205.0333.1000.4
][
M
5(+) 6(+)5(+) 6(-)
5(+)6(-)
5(+) 6(-)
n x( ) n x( )
n s( )
dependency
17
The constraint equation is not enough to determine coefficients of p and q,
Another constraint equation is required
axwhenqpaaf
qpxxQaxxf
,)(
)()()( 2
axwhenpaf
pxQaxxQaxxf
,)(
)()()()(2)( 2
How to get additional constraints
18
Original data from Prof. Liu Y J
(1984)
crack
BEMCauchy kernel
singular
DBEMHadamard
kernelhypersingular
FMM
Large scaleDegenerate kernel
Desktop computer fauilure
(2000)Integral equation
1888
19
Fundamental solution
Field response due to source (space)
Green’s function Casual effect (time)
K(x,s;t,τ)
20
Green’s function, influence line and moment diagram
P
Force
Moment diagrams:fixed
x:observer
P
Force
Influence line s:moving
x:observer(instrument)
sG(x,s)
x
G(x,s)x sx=1/4
s
s=1/2
21
Two systems u and U
u(x)source
U(x,s)
s
Infinite domain
Domain(D)
Boundary (B)
22
Dual integral equations for a domain point(Green’s third identity for two systems, u and
U)
Primary field
Secondary field
where U(s,x)=ln(r) is the fundamental solution.
2 ( ) ( , ) ( ) ( )B
u x T s x u s dB s ( , ) ( ) ( ), BU s x t s dB s x D
2 ( ) ( , ) ( ) ( )B
t x M s x u s dB s ( , ) ( ) ( ), B
L s x t s dB s x D
sn
UxsT
),(xn
UxsL
),(xs nn
UxsM
2
),(
ut
n
23
Dual integral equations for a boundary point(x push to boundary)
Singular integral equation
Hypersingular integral equation
where U(s,x) is the fundamental solution.
B
sdBsuxsTVPCxu )()(),( . . .)( B
BxsdBstxsUVPR ),()(),( . . .
B
sdBsuxsMVPHxt )()(),( . ..)( B
BxsdBstxsLVPC ),()(),( . . .
sn
UxsT
),(xn
UxsL
),(xs nn
UxsM
2
),(
24
Potential theory
Single layer potential (U) Double layer potential (T) Normal derivative of single layer
potential (L) Normal derivative of double layer
potential (M)
25
Physical examples for potentialsP
M
U:moment diagram
M:shear diagram
T:moment diagram
L:shear diagram
Force Moment
26
Order of pseudo-differential operators Single layer potential
(U) --- (-1) Double layer
potential (T) --- (0)
Normal derivative of single layer potential (L) --- (0)
Normal derivative of double layer potential (M) --- (1)
2 2
0 0( , ) ( ) - ( , ) ( )L t d t CPV L t d
2
0( , ) ( ) ( )
( ( )) ''
( ( )) ''
M u d u
u u
D D u u
2 2
0 0( , ) ( ) ( , ) ( )T u d u CPV T u d
Real differential operator Pseudo differential operator
27
Calderon projector
2
2
1[ ] [ ] [ ][ ] [0]
4 [ ][ ] [ ][ ]
[ ][ ] [ ][ ]
1[ ] [ ] [ ][ ] [0]
4
I T U M
U L T M
M T L M
I L M U
28
How engineers avoid singularityHow engineers avoid singularity
BEM / BIEMBEM / BIEM
Improper integralImproper integral
Singularity & hypersingularitySingularity & hypersingularity RegularityRegularity
Bump contourBump contour Limit processLimit process Fictitious Fictitious boundaryboundary
Collocation Collocation pointpoint
Fictitious BEMFictitious BEM
Null-field approachNull-field approach
CPV and HPVCPV and HPVIll-posedIll-posed
Guiggiani (1995)Guiggiani (1995) Gray and Manne (199Gray and Manne (1993)3)
Waterman (1965)Waterman (1965)
Achenbach Achenbach et al.et al. (1988) (1988)
29
• R.P.V. (Riemann principal value)
• C.P.V.(Cauchy principal value)
• H.P.V.(Hadamard principal value)
Definitions of R.P.V., C.P.V. and H.P.V.using bump approach
NTUCE
R P V x dx x x x. . . ln ( ln )z
1
1
- = -2 x=-1x=1
C P Vx
dxx
dx. . . lim
z zz 1
1 1
1
1 1 = 0
H P Vx
dxx
dx. . . lim
z zz 1
1
2
1
12
1 1 2 = -2
0
0
x
ln x
x
x
1 / x
1 / x 2
30
Principal value in who’s sense
Common sense Riemann sense Lebesgue sense Cauchy sense Hadamard sense (elasticity) Mangler sense (aerodynamics) Liggett and Liu’s sense The singularity that occur when the base
point and field point coincide are not integrable. (1983)
31
Two approaches to understand HPV
1
2 2-10
1lim =-2 y
dxx y
H P Vx
dxx
dx. . . lim
z zz 1
1
2
1
12
1 1 2 = -2
(Limit and integral operator can not be commuted)
(Leibnitz rule should be considered)
1
01
1{ } 2
t
dCPV dx
dt x t
Differential first and then trace operator
Trace first and then differential operator
32
Bump contribution (2-D)
( )u x
( )u xx
sT
x
sU
x
sL
x
sM
0
0
1( )
2t x
1 2( ) ( )
2t x u x
1( )
2t x
1 2( ) ( )
2t x u x
33
Bump contribution (3-D)
2 ( )u x
2 ( )u x
2( )
3t x
4 2( ) ( )
3t x u x
2( )
3t x
4 2( ) ( )
3t x u x
x
xx
x
s
s s
s0`
0
34
Successful experiences since 1986
35
Solid rocket motor (Army 工蜂火箭 )
36
X-ray detection ( 三溫暖測試 )
Crack initiation crack growth
Stress reliever
37
FEM simulation
38
Stress analysis
39
BEM simulation
40
Shong-Fon II missile (Navy)
41
IDF (Air Force)
42
Flow field
43
V-band structure (Tien-Gen missile)
44
FEM simulation
45
46
Seepage flow
47
FEM (iteration No.49) BEM(iteration No.13)
Initial guessInitial guess
After iteration After iteration
Remesh areaRemesh line
Free surface seepage flow using hypersingular formulation
48
Meshes of FEM and BEM
49
Incomplete partition in room acoustics
U T L Mm ode 1.
m ode 2.
m ode 3.
0.00 0 .05 0 .10 0 .15 0 .200 .00
0 .05
0 .10
0 .00 0 .05 0 .10 0 .15 0 .200 .00
0 .05
0 .10
0.00 0.05 0.10 0.15 0.200.00
0.05
0.10
0.00 0.05 0.10 0.15 0.200.00
0.05
0.10
0.00 0.05 0.10 0.15 0.200.00
0.05
0.10
0.05 0.10 0.15 0.20
0.05
587.6 H z 587.2 H z
1443.7 H z 1444.3 H z
1517.3 H z 1516.2 H z
b
a
e
c
2 2 0u k u t0
t=0
t=0
t=0
t=0
t=0
50
Water wave problem with breakwaterWater wave problem with breakwater
Free water surface S
x
Top view
O
y
zO
xz
S
breakwater
breakwater
oblique incident water wave 0)~()~( 22 xuxu
51
Reflection and Transmission
0.00 0.40 0.80 1.20 1.60 2.00
kd
0.00
0.40
0.80
1.20
lRl a
nd lT
l
k h = 5D e ep w a te r th eo ry (U rse ll, 1 9 4 6 )M u lti-d o m a in B E M (L iu e t a l ., 1 9 8 2 )U T m e th o d o f D B E M (C o m b in e d L M , 3 2 0 e le m en ts)L M m e th o d o f D B E M (C o m b in e d U T , 3 2 0 e le m en ts)
R
T
52
Cracked torsion bar
T
da
53
IEEE J MEMS
54
55
56
Radiation and scattering problems
Nonuniform radiaton scattering
1),( au0),( au
Drruk ),( ,0),()( 22
32
5
Drruk ),( ,0),()( 22
2
57
BEM FEM
Adaptive Mesh
- 1 - 1 0 1 1
- 1
- 1
0
1
1
5
DtN interface
58
Errorestimator
Error estimator
SolutionSolution
Strategy of adaptive BEM
Miller &Burton
SingularEquation
ut Mk
iTL
k
iU
~~
][][
tu UTUT~~
][][
HypersingularEquation
tu LMLM~~
][][
u,t u,t
21
59
-1.50 -1.00 -0.50 0.00 0.50 1.00 1.50
-1.50
-1.00
-0.50
0.00
0.50
1.00
1.50
-1.50 -1.00 -0.50 0.00 0.50 1.00 1.50
-1.50
-1.00
-0.50
0.00
0.50
1.00
1.50
Numerical solution: BEM Numerical solution: FEM
64 ELEMENTS 2791 ELEMENTS
Nonuniform radiation : Dirichlet problem 2ka
9
60
Is it possible !
No hypersingularity !
No subdomain !
61
Dual BEM
Degenerate boundary problems
u=0r=1
0)()( 22 xukC
C
u=0r=1
0)()( 22 xukC C
CC
u=0r=1
0)()( 22 xukC
C
interface
Subdomain 1
Subdomain 2
Subdomain 1
Subdomain 2
1cu
1cu
1fu
1fu
2fu
2fu
2ft
1ft
2ft
1ft
2cu
2cu
1cu
1cu
C
C
C
C
Multi-domain BEM
}}{{}]{[
}]{[}]{[
tLuM
tUuT
62
Conventional BEM in conjunction with SVD
Singular Value DecompositionH
PPPMMMPMU ][][][][
Rank deficiency originates from two sources:
(1). Degenerate boundary
(2). Nontrivial eigensolution
Nd=5 Nd=5Nd=4
63
0 2 4 6 8
k
0.001
0.01
0.1
1
N d + 1
0 2 4 6 8
k
1e-020
1e-019
1e-018
1e-017
1e-016
1e-015
1e-014
d e t [ U ( k ) ]
0 2 4 6 8
k
1e-038
1e-037
1e-036
1e-035
1e-034
d e t [ K U
L ]
Dual BEM
UT BEM + SVD
(Present method)
versus k1dN
Determinant versus k
Determinant versus k
Sub domain
64k=3.14 k=3.82
-0.8 -0.6 -0.4 -0.2 0 0.2 0.4 0.6 0.8
-0.8
-0.6
-0.4
-0.2
0
0.2
0.4
0.6
0.8
k=4.48
UT BEM+SVD
-0 .8 -0 .6 -0 .4 -0 .2 0 0.2 0.4 0.6 0.8
-0 .8
-0 .6
-0 .4
-0 .2
0
0.2
0.4
0.6
0.8
-0 .8 -0 .6 -0 .4 -0 .2 0 0.2 0.4 0.6 0.8
-0 .8
-0 .6
-0 .4
-0 .2
0
0.2
0.4
0.6
0.8
-0 .8 -0 .6 -0 .4 -0 .2 0 0.2 0.4 0.6 0.8
-0 .8
-0 .6
-0 .4
-0 .2
0
0.2
0.4
0.6
0.8
k=3.09
-0.8 -0.6 -0.4 -0.2 0 0.2 0.4 0.6 0.8
-0.8
-0.6
-0.4
-0.2
0
0.2
0.4
0.6
0.8
k=3.84
-0.8 -0.6 -0.4 -0.2 0 0.2 0.4 0.6 0.8
-0.8
-0.6
-0.4
-0.2
0
0.2
0.4
0.6
0.8
k=4.50
FEM (ABAQUS)
65
Disclaimer (commercial code)
The concepts, methods, and examples using
our software are for illustrative and educational purposes only. Our cooperation assumes no liability or responsibility to any person or company for direct or indirect damages resulting from the use of any information contained here.
inherent weakness ?
misinterpretation ? User 當自強
66
BEM trap ?Why engineers should learn
mathematics ? Well-posed ? Existence ? Unique ?
Mathematics versus Computation
equivalent ? Some examples
67
Numerical and physical resonance
a
m
k
e i t
incident wave
e i t e i t
radiation
Physical resonance Numerical resonance
, if ufinite
( )
2 2
, if u finite lim00
k
m
68
Numerical phenomena(Degenerate scale)
Error (%)of
torsionalrigidity
a
0
5
125
da
Previous approach : Try and error on aPresent approach : Only one trial
T
da
Commercial ode output ?
69
Numerical phenomena(Fictitious frequency)
0 2 4 6 8
-2
-1
0
1
2UT method
LM method
Burton & Miller method
t(a,0)
1),( au0),( au
Drruk ),( ,0),()( 22
9
1),( au0),( au
Drruk ),( ,0),()( 22
9
A story of NTU Ph.D. students
70
Numerical phenomena(Spurious eigensolution)
0 1 2 3 4 5 6 7 8 9 10 11 12fre q u e n cy p a ra m e te r
1E-080
1E-060
1E-040
1E-020
de
t|SM
|
C -C annular p la teu, com plex-vauled form ulation
T<9.447>
T: T rue e igenvalues
T<10.370>
T<10.940>
T<9.499>
T<9.660>
T<9.945>
S<9.222>
S<6.392>
S<11.810>
S : Spurious e igenvalues
ma 1
mb 5.0
1B
2B
71
TreatmentsSVD updating term
Burton & Miller method
CHIEF method
NN
cc
cc
SM
SMC
8162
1
cccc SMiSM21
NNN cCCUCUC
CCUCUC
UU
UU
UU
UU
C
8)4(2
*
2121
2121
22212221
12111211
22212221
12111211
][
Mathematical analysis and numerical study for free vibration of plate using BEM-71
a
b
1B
2B
72
Conclusions
• Introduction of dual BEM
• The role of hypersingular BIE was examined
• Successful experiences in the engineering applications us
ing BEM were demonstrated
• The traps of BIEM and BEM were shown
73
The End
Thanks for your kind attention
74
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E-mail: [email protected]
75
76
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