Post on 16-Mar-2020
5.2 The Direct Eulerian-Lagrangian Approach
For transonic flows where , the aeroelasticproblem is
inherently nonlinear, because
1)
Mixed flow with strong m
oving shocks occur.
2)
Shock m
otion is highly nonlinear (even at sm
all am
plitudes)
3)
The thickness effects are significant and enter the governing
equations in a nonlinear manner.
Flow Regim
es:
a)Subcritical: Flow is entirely subsonic throughout.
b)
Supercritical: Mixed subsonic-supersonic flow (em
bedded
supersonic pockets)
1<
<∞
MM
cr
1<
<∞
crM
M
1<
<∞
MM
cr
Supercritical Flow Regim
e
Aeroelastic Phenomena in Transonic Regim
e
a) Flutter boundary for
NACA 0006
model corresponding to fixed mass ratio
of 20, b) corresponding boundary if U_inf
and mass ratio is decreased until flutter
occurs, c) Theodorsen-G
arrick rule for
subsonic flutter.
Aeroelastic Phenomena in Transonic Regim
e
Effect of thickness on the transonic flutter boundary.
Aeroelastic Phenomena in Transonic Regim
e
Experim
ental data showing the effect of angle of attack on the
transonic flutter boundary.
For details of this form
ulation, one may refer to Prof. Oddvar O. Bendiksen’sresearch.
The Direct Eulerian-Lagrangian Approach
FE Lagrangian Code
Lagrangian Mesh
The Direct Eulerian-Lagrangian Approachcont.
•In this approach the
fluid-structure system
is modeled and
integrated as a single dynam
ical system
without introducing
norm
al or assumed m
odes.
•This approach predicts the energy exchange between the fluid
and structure very accurately.
•In this form
ulation time synchronization avoids phase errors
which m
ay lead to assesment of incorrect instability behavior.
•The
fluid-structure boundary is defined accurately and
consistently using the structural finite elem
ent shape functions
and the actual wing deform
ations.
Aerodynam
ic M
odel
•Classical inviscid Euler Equations, using the Direct Eulerian-
Lagrangian form
ulation.
0dV
ds
tΩ
∂Ω
∂+
⋅=
∂∫
∫W
Fn
1 2 3
u u u eρ ρ ρ ρ ρ
=
W
()
()
()
()
()
11
22
33
jj
jj
j
jj
jj
jj
j
jj
iji
uU
uu
U
uu
U
uu
U
eu
Uu
ρ
ρσ
ρσ
ρσ
ρσ
−
−
−
=
−−
−−
−−
F
()
11
2ii
pe
uu
ργ
=−
−
ijij
pσ
δ=−
..
.i
ii
ii
dV
dS
dV
dS
dS
tt
ϕϕ
ϕϕ
ϕΩ
ΩΩ
∂Ω∂Ω
∂∂
+∇
=+
−∇
∂∂
∫∫
∫∫
∫W
FW
Fn
F
Aerodynam
ic M
odel cont.
•Galerkin FE discretization is applied.
•Space-Discretized equations shown in m
atrix form
.
0ij
ji
i
j
d dt
+−
=∑mW
QD
Structural Model
Structural Model cont.
•Based on a specific type of aeroelastic wing construction that has
been used extensively in wind tunnel tests.
•The structural part is a thin flat aluminum alloy plate of the same
planform
as the wing, covered by balsa wood or lightweight foam
to form
the desired airfoil shape.
•Employs shear deform
able plate type finite elem
ents (the Discrete
Shear Triangle, DST, by Batoz and Lardeur).
Structural Modelcont.
Fluid-Structure Boundary Conditions
•Kinem
atic boundary condition of tangent flow at a boundary is
0.
=≡
∇+
∂∂Dt
DB
Bu
tB
Mappings Between Aerodynam
ic and Structural Meshes
Structural Element
Aerodynam
ic faces
on the wing surface
Tetrahedron
aerodynam
ic cell
xy
z
Mappings Between Aerodynam
ic and Structural Meshes
Dynam
ic M
esh M
otion
•The rest of the CFD m
esh is deform
ed using ‘spring analogy’, see
work by Batina for details.
Consistent Aerodynam
ic Load Calculations
•Aerodynam
ic load vector is evaluated using numerical integration
(Gaussian Quadrature), considering the pressures at lower and
upper skins.
Fluid-Structure Tim
e-Marching
•Four-stage Runge-Kutta schem
e, shown below for the fluid.
()
41
WW
n=
+()
[]
()
()
()
()
()
()
[]
13
4
00
14
WD
WQ
tW
mm
W−
∆−
=−
α
()
[]
()
()
()
()
()
()
[]
00
1
00
11
WD
WQ
tW
mm
W−
∆−
=−
α
()
nW
W=
0
•Reduced order structural equations for the Runge-Kutta Schem
e.
[]
elastic
aero
FF
vM
−= v
q=
.
• • •
Numerical Results:
Flutter Calculations
NACA 0012 Typical Section M
odel (2D)
•Nonlinear flutter-divergence interaction at Mach 0.8 and U = 3.6
•Based on the
short term
plot (RHS) one
would incorrectly
conclude that the model is stable and that no flutter occurs.
•The Direct Eulerian-Lagrangian method has been successfully
applied to other w
ing m
odels including fighter and transport type
wings.
•Recently a geometrically nonlinear structural model has been
implemented in this form
ulation leading to very unique results
that has not been computationally observed before, i.e. high
altitude flutter. For further details please see the work by Prof.
Bendiksen and Dr. Seber.