Optimization of Tapered Laminates with Ply Drops
14
ACCIS Conference 30th June 2009 University of Bristol Optimization of Tapered Laminates with Ply Drops Dr. Giuliano Allegri
Transcript of Optimization of Tapered Laminates with Ply Drops
ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Optimization of Tapered Laminates
with Ply Drops
Dr. Giuliano Allegri
2ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Conte
nt
1)Ply d
rop-o
ffs: a n
ecessary
evil?
2)Dam
age Initiation a
t ply d
rop-o
ffs: a fra
ctu
re m
echanics p
ers
pective
3)Optim
ization o
f ply d
rop sequences
3ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Ply d
rop-o
ffs: a n
ecessary
evil?
•Dro
pping o
ff p
lies a
llows changing lam
inate
thickness a
nd com
position
•Ply dro
ps re
pre
sent
an abru
pt
change in th
e geom
etric/m
echanical
pro
perties of
the lam
inate
, so th
ey behave as stress ra
isers
and
delam
ination initiato
rs
4ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Dam
age Initiation @
Ply D
rop-o
ffs
•A fra
ctu
re m
echanics p
ers
pective
•Delam
inations em
anate
from
th
e re
sin pocket tip;
if th
e latter
is
considere
d a
s a
void, initiation loads c
an b
e d
erived fro
m fra
ctu
re
mechanics considera
tions w
hen L1, L3 →
0
•The s
train e
nerg
y release rate
s (SERR) expre
ssions a
re c
om
pute
d
em
ploying b
eam
theory
and o
rthotropic rescaling
M
M-P(H/2+
Lz-
Rz)
P
P
5ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
SERR F
orm
ulas: lim
itations
Geometric idealization –limitations:
1.re
sin pockets
are
not
exactly right
triangles;
2.th
e
curv
atu
res
of
the
fibre
s
surrounding
the
resin
are
m
uch sm
ooth
er th
en a
ssum
ed
tH dL1
L2
L3
t-H
φP1
M1
M1-P1H/2
z
x
tH dL1
L2
L3
t-H
φP1
M1
M1-P1H/2
z
x
3. th
e thickness o
f th
e b
elt a
nd core
sub-lam
inate
s is n
ot consta
nt
All the assumptions above lead to conservative estimationsof the strain energy release
rates (SERR) for delaminations emanating from the resin pocket tips
6ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Topological Optim
ization
Actu
al
Idealized
An arbitrary laminate configuration comprising ply drop-offs is
idealized as a sequence of asymmetrically tapered units
7ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Topological Optim
ization T
ool
•Two sta
ge o
ptim
ization tool
1)
Dete
rmin
istic first sta
ge: find w
hich p
lies h
ave to b
e term
inate
d in
ord
er to
matc
h the thick section lam
inate
with the thin section o
ne
2)
Sto
chastic second sta
ge:
find th
e optim
al ply dro
p-o
ff sequence
via
the
min
imization
of
the
maxim
um
SERR
failure
index
associate
d w
ith the p
ly term
inations, e.g
.
Ste
p 2
) is b
ased o
n sim
ulate
d a
nnealing w
ith sto
chastic tunnellin
g
III
IcIIc
GG
FIG
G=
+
8ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Guidelines in the litera
ture
•Pra
ctical “rules o
f th
um
b”fo
r designing tapere
d lam
inate
s:
1)
alw
ays try to
dro
p th
e innerm
ost
block in ord
er
to m
atc
h th
e
lam
inate
thick a
nd thin sections;
2)
dro
p
0°
plies
close
to
the
thick
section,
±45°
in
the
middle
sections a
nd 9
0°plies close to the thin e
nd;
3)
in pure
bending cases sta
rt dro
pping th
e in
nerm
ost
plies of
the
innerm
ost block;
4)
in pure
axial fo
rce cases sta
rt dro
pping th
e oute
rmost
plies of
the
innerm
ost block
5) pro
mote
inte
rleaving b
y a
voiding d
ropping a
dja
cent plies
6)
if
inte
rleaving
is
not
possible,
try
to
maxim
ise
the
dista
nce
betw
een the a
dja
cent ply term
inations
These rules a
re e
mbedded in a
Fuzzy Logic
Optim
ization/A
nalysis T
ool called “ALTO”(p
oste
r)
9ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
A S
imple C
ase S
tudy
•Sim
ply sym
metrical ta
pere
d lam
inate
Thick Section Stacking Sequence:
[0°/0
°/+
45°/9
0°/9
0°/-
45°/0
°/0
°] 3
S
Thin Section Stacking Sequence:
[0°/0
°/+
45°/-
45°/ 0°/+
45°/-
45°/ 0°/+
45°/-
45°/ 0°] S
6 mm
3 mm
250 mm
x
z
25 m
m
MM
mm
NG
mm
NG
GPa
GGPa
GG
GPa
EE
GPa
E
IIc
Ic/
9.0
/36
.0
3.0
8.3
6.4
7.8
4.142
23
13
12
23
13
12
32
1
==
==
=
==
=
==
=
νν
ν
Mate
rial pro
perties:
T300/9
14C
10
ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
•Sim
ple In-O
ut
Term
inations
(A)
•Litera
ture
Guidelines
(B)
•Optim
ization
Algorith
m
(C)
00
450
-450
900
Configura
tions for a P
ure
Bending Load
11
ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
LS-D
YNA F
E m
odels
12
ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
LS-D
YNA F
E m
odels
13
ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Com
parisons
•Sim
ple in-o
ut dro
pping a
nd litera
ture
guidelines g
ive sim
ilar re
sults
•The optim
ization to
ol pre
sente
d here
pro
duces th
e b
est re
sults,but
resulting lam
inate
is n
ot sym
metric
•The analytical solution pro
vides a re
asonable estim
ate
of th
e fa
ilure
loads w
hen com
pare
d to h
igh fidelity
FEM tools
Configuration
LS-DYNA (N)
Analytical (N)
(A)
2500
1995 (-20.2 %
)
(B)
2560
1995 (-22.1%)
(C)
3000
3270 (+9%)
Delam
ination initiation load from the FE m
odel and the analytical solution
14
ACCIS
Confe
rence
30th
June 2
009
Univers
ity o
f Bristo
l
Sum
mary
& C
onclusions
•Analytical
expre
ssions
for
the
SERR
associate
d
with
delam
inations
em
anating from
ply dro
p-o
ffs locations have been work
ed out
and
validate
d a
gainst FE a
nalysis.
•Realistic p
ly d
rop-o
ff c
onfigura
tions h
ave b
een c
onsidere
d, with the a
im a
t obta
ining conserv
ative e
stim
ate
s for th
e S
ERR.
•Since the resin p
ockets
pre
sent at th
e term
ination location a
re c
onsidere
d
as v
oids, it is p
ossible to p
redict th
e d
elam
ination initiation u
sin
g the S
ERR
values for zero
debond
length
s.
•A tw
o ste
p optim
ization algorith
m has been developed fo
r m
atc
hing th
e
thick and th
in sections of
tapere
d lam
inate
s;
this pro
cedure
allows
identify
ing w
hich p
lies to d
rop a
nd w
here
(in a
topological sense)
•The o
ptim
ization p
rocedure
has b
een v
alidate
d b
y m
eans o
f virtu
al te
sting
Acknowledgem
ents
to R
olls-R
oyce P
lc for th
eir support o
f th
is researc
h
