Configuration Design of Air Breathing

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Configuration Design of Air Breathing

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Title: Configuration Design of Air Breathing

1
2nd Progress Seminar
22nd August,2003
Configuration Design of Air Breathing Hypersonic
Vehicle using Numerical Optimization
J. Umakant Research Student ( External) Roll No.
01401701
CASDE Dept. of Aerospace Engineering IIT, Bombay
2
Summary of 1st Progress
Seminar September 2002

Problem Formulation
Conceived Overall Design process for
Air-Breathing Hypersonic configuration
Disciplinary Interactions
Parameterization of vehicle and Analysis
Modules
Review of literature of Aerospace Vehicle Design
using MDO
3 Ph D thesis
- McQuade Development of CFD based GLA
factors for 2D scramjet vehicle
- Guinta VCRSM of HSCT Wing
- Old Robust design of SSTO vehicle
12 Papers from 1990 onwards
- Bowcutt (1999) MDO Hypersonic Vehicle
Optimization
- Design synthesis tools for Launch Vehicles
- Papers related to approximation strategies
Fore-body optimization using engineering method
with FFSQP optimizer
- two design variables ( fore-body compression
angles)
objective function ma / Cd subject to
constraints on Mintk , L/D , h/l

3
2nd Progress Seminar

I Hypersonic Technology Demonstrator
Vehicle(HSTDV) - Mission -
Vehicle Background II HSTDV Configuration
- Problem Statement -
Parameterization and Trade-Offs -
Engineering Methods for Analysis III
Optimization and Results IV Potential
Improvements in Aerodynamic Prediction code
4
HYPERSONIC TECHNOLOGY DEMONSTRATOR
TO DEMONSTRATE AUTONOMOUS SUSTAINED FLIGHT AT
HYPERSONIC SPEED
SCRAMJET TEST
ALTITUDE 32.5 km MACH NO. 6.5 TEST
DURATION 400 s
SCRAMJET MACH NO. 5.5
RAMJET
DUAL MODE TEST
ALTITUDE 20 km MACH NO. 4.5
1 m DIA
5
HSTDV Vehicle Discipline
Interactions

Integrated Engine and Airframe
Entire undersurface of the airframe forms part
of the engine
Fore-Body
pre-compressed air to the intake , aerodynamic
characteristics, volume
After-Body
thrust, stability characteristics , after-body
volume

Optimizer
XD
f , g
Aerodynamic heating, Detailed Modeling of Intake,
Combustor, Nozzle , Trajectory Optimization
6
MDO - Implementation Issues

Mathematical modeling and Computational Expense
low fidelity methods computationally cheap
but not sufficiently accurate
high fidelity methods highly accurate but
computationally prohibitive

Optimization Procedures
problem formulation
algorithms for global optimization

Organizational Complexity
disciplinary expertise is distributed across
the organization, not available
centrally
difficulty in data exchange

7
Broad Strategy for HSTDV Design using MDO
I Overall Vehicle Design using Engineering
Methods ( low fidelity ) - Sizing,
Aerodynamics, Propulsion and Performance
- Identify important design variables
- Build a multidisciplinary analysis tool
- Calibration factors -
Numerical optimization
II Methods to create Approximate Models for
High Fidelity Analysis - Design and
Analysis of Computer Experiments - Data
fusion ( low fidelity high fidelity )
III Global Optimization Strategies using DACE
suggested in Statistical literature.
IV Methods to take into account uncertainties
in approximate model
8
Parameterization of HSTDV Body
W_fac
t_fac
XD ?1, ?2, ?3 , ?n_pl , ?wc , wfac_pl,
tfac_pl,,Hcruise
Wing AR0.6, b 1.6m, ?0.4 Tail AR2.3
, b 1.4m , ?0.4 Airframe thickness t 50mm
Lmid 2.5 m
9
Fore-body Parameterization 3 Ramp configuration
10
After-body Parameterization
?noz
Max pnoz Sin(?noz) s.t 0.2 pnoz/pne
Lab
Mne 1.5 pne 1.1 atm Lab 1.5m 1-D P-M
relations to estimate pnoz ?noz
17
1.0
pnoz/pne
Pnoz labSin ?noz
0.0
0
40
?noz (deg.)
?noz (deg.)
11
Trade-Offs
12
Optimizer
XD
f , g
External Configuration Model
External Compression Model
Forebody length and height
Volume Body Discretization
Mass flow of Air Capture
Aero Model
Mass C.G.
Overall Aero Control data
Adjust Ballast
Thrust Model
Specific Impulse
No
Trim
Yes
Fuel flow rate Thrust Deliverable
Trim deflection , Drag Updated mass
Performance Model
13
HYPERSONIC TECHNOLOGY DEMONSTRATOR
-CONFIGURATION
PAYLOAD 400 kg FUEL 250 kg TOTAL WEIGHT
1240 kg
14
External Compression Model
M? , ? Input Variables ?1 , ?2 , ?3
Output Fore-body dimensions ( l1
,l2 ,l3 ,h1 ,h2 ,h3 ) Intake Entry
Conditions pintk , Mintk , ma
External Compression Model Oblique shock theory
15
Assuming shock on lip condition
16
Typical Results from External Compression model
First Ramp Angle 5 deg.
Intake Entry Mach No.

Total Pressure Recovery
Mass flow rate ( Kg/s)
Mass flow rate ( Kg/s)
Calibration factor Mass flow rate based on Euler
CFD calculations is about 30 lower as compared
to the estimate from low fidelity analysis Each
Euler CFD run on a 8node P-III cluster requires
15 hours
17
External Configuration Model
Input Variables ?1 , ?2 , ?3 , ?n_plan , ?wc
, wfac_pl , tfac_pl,
Outputs Body discretization
(x,y,z) Wing Tail discretization Internal
Volume Overall Mass (TOGW) Centers of
gravity
External Compression Model (l1,l2,l3
,h1,h2,h3)
External Configuration Model
18
External Configuration Model
Body Discretization

Input Parameters
Swid_ntip 0.1m
Lmid 2.5m
?noz 20
a/b 2.0

Lnoz
Lmid
x0
xfb1_stn
xfb2_stn
xfb3_stn
xmid_stn
xnoz_stn
a
b
w
b
h
19
External Configuration Model
Internal volume
body_int vol fb1_v fb2_v fb3_v midbd_v
aftbd_v
Airframe Mass
Mass ?s Swet ?s 20 kg / m2
surface area density
bodyaf_m 1.2 (fb1_m fb2_m fb3_m midbd_m
aftbd_m)
20
External Configuration Model
Airframe Center of gravity
Xc.g.
Xc.g.
bodyaf_xcg ( fb1_m fb1_xcg fb2_m fb2_xcg
fb3_m fb3_xcg
midbd_m midbd_xcg aftbd_m aftb_xcg) /
bodyaf_m
21
External Configuration Model
equip_m nc_m bal_m obc_m ins_m tm_m
tank_m
wing_m baseline wing mass w_fac
TOGW bodyaf_m equip_m eng_m fuel_m
wing_m tail_m
tm_xcg xfb3_stn 0.25(xmid_stn-xfb3_stn)
tm_zcg 0.5zlh_mid
act_xcg xmid_stn act_zcg zlh_mid
to_xcg ( bodyaf_m bodyaf_xcg
equip_mequip_xcg eng_meng_xcg
fuel_m fuel_xcg wing_m wing_xcg
tail_mtail_xcg) / TOGW
22
Aerodynamics Model
External Configuration Model Vehicle geometry
definition (x,y,z)
Aerodynamics Model Tangent Cone / Tangent Wedge
Method ( local surface inclination )
Overall CN , Cm , CA Control surface characteristi
cs
23
Typical Aerodynamic Characteristics of HSTDV
M 6.5
CN
Cm_xcg
?
?
24
L/D
ANGLE OF ATTACK (deg.)
25
Fidelity of Analysis

Calibration Factors (Scale factor)
Use CFD computations to generate calibration
factors.
Valid within specified move limits

Zeroth order scale factor 20 15
15 30
Higher order scale factors will be used in future
studies
26
Trim Model
Basic Body, Wing Tail Aero characteristics Propu
lsive force moment
Evaluate Static stability
Exit with tail size and updated Mass and
C.G ?trim and ?trim and trim drag
Yes
Statically stable
Adjust Ballast weight
No
27
Trim Model
?
M?
N
A
?
N Np W Cos ? T A W Sin ?
W
?
0.25T
0.75T
Np 0.25 T / tan ?noz
?noz
Np
Mp Np (to_xcg - x_noz) 0.25T (to_zcg - z_noz)
0.75T (to_zcg - z_noz)
Mtrim Maero_cg Mp_cg 0
28
Thrust Model
External Compression Model ma ,
Mintk
Equivalence ratio 1
Thrust Model
Isp (M, H_cr)
Thrust deliverable
29
Performance Analysis
Aerodynamics
Performance - 2DOF trajectory simulation
Range R
Propulsion
Sizing
30

Multi-disciplinary Design Optimization for HSTDV
Problem Statement

Minimize f(XD) - (Range)/2000
g1 MI / 4.0 1 scramjet considerations
g2 ? / 20.0 1 Aero, control and actuation
g3 L / 7.5 1
g4 H / 0.85 1 sizing
g5 W / 0.85 1
g6 TOGW / 1325.0 1 system
g7 AF / Th deliv 1 Aerodynamics Propulsion
?

Side constraints 3 ? ?1 ? 10 1
? ?2 ? 10 1 ? ?3 ? 10
3 ? ? n_pl ? 6 0 ? ? wc ? 6
0.8 ? wfac_pl ? 1 0.8 ? tfac_pl ? 1.1
30 ? Hcr ? 35
Optimization variables XD ?1, ?2, ?3 , ?n_plan
, ?wc , wfac_pl,tfac_pl,,Hcruise
31
Results
?1
?2
?n_pl
?3
Iteration number
Iteration number
32
?w_c
?w_fac
?t_fac
H_cr
Iteration number
Iteration number
33
Cruise Range
g1 MI / 4.0 1
Iteration number
Iteration number
g2 ? / 20.0 1
g3 L / 7.5 1
Iteration number
Iteration number
34
g4 H / 0.85 1
g5 W / 0.85 1
Iteration number
Iteration number
g6 TOGW / 1325.0 1
g7 AF / Th deliv 1
Iteration number
Iteration number
35
Comparison of Initial Configuration Outline with
Optimum configuration
Baseline Optimum

Body Outline
Tail planform
36

Optimum design with respect
to initial design
4 increase in dry weight
15 increase in fuel volume
1.5 decrease in drag
17 increase in cruise range
Physical constraints on
Mintk , ? and TOGW are active

37
Sensitivity of objective function with respect to
design variables at initial design point
Optimum configuration has lower values for ?1 and
?2 as compared to initial design. Decreasing
these variables at the initial design point ,
results in a decrease in the objective function
ie, cruise range However, the inter-play
among the design variables has resulted in a net
improvement in objective function.
? ?R / ? Xi 109.69
38
Fidelity of Analysis

Physics Based Corrections
Improve the accuracy of the Engg. Methods like
Tangent Cone
through correlation factors generated using CFD
Globally valid

Equivalent Body for conical flow calculations
Actual Body
39
Cone Body (semi-included angle 5 )
40
Cone Body (semi-included angle 5 )
?Cp
Angle of attack (deg.)
Error ?Cp Cp (TCM) Cp (CFD) at ? 0
41
Global Correction Factor
?Cp ?/Sin ?
?
Cp (corrected) Cp(TCM) - ?Cp
42
Further course of Action
Focus on methods to include high fidelity
analysis

Summary of methods adopted for Aerospace Vehicle
Design
Various strategies have been used to address the
issue of
computational burden associated with high
fidelity analysis
Parametric methods with RSM
Global Local Approximation
First Order Approximate Model Management
Variable Complexity Response Surface Method

Statistical Literature
Design and Analysis of Computer Experiments

43
Design and Analysis of Computer Experiments
Ref Sacks et.al. 10 Jones et.al. 11
Motivation Given function values Y at sampled
points x , one simple way to create response
surface is through linear regression

In the above model, the errors are assumed
independent. This assumption
is justified for physical experiments.
Computer experiments are however,
deterministic.
Lack of random error in computer experiments and
any lack of fit is entirely
due to collection of left out terms in x.
In DACE model, ?(i) is interpreted as ?(x(i))
ie., errors are correlated.

44
Further course of Action

DACE modeling for ma , CN, Cm and CA
Use data fusion ( low fidelity high fidelity)
validation
Optimization Strategies
Robustness of design through error propagation

45
Design and Analysis of Computer Experiments
The correlation is high if two points x (i) and x
(j) are close and low when the points are far
apart.

(Jones et.al.)
46
Design and Analysis of Computer Experiments
DACE Model
global effect
local effect
(Jones et.al.)
are parameters estimated by maximizing
the likelihood of the sample y ( y(1),, y(n)
)'
47
Design and Analysis of Computer Experiments
RSM model using DACE modeling
ri(x) Corr ?(x), ?(x(i)) , i1,.n
RSM model using regression

48
Design and Analysis of Computer Experiments
Illustration (Jones et.al.)
DACE response surface
Branin test function Contours
Quadratic surface fit
49
Design and Analysis of Computer Experiments
Global Optimization for a 1-D function using DACE
model (Jones et.al.) Expected Improvement
Criteria for selecting additional sample points
50
DACE fit for Pitching Moment Data Predictions are
at the sampled points itself
Cm
?
?

-45 , -35 , -25 , -15 , -5 , 0 , 5 ,
15, 25 35 , 45
? 0 , 2 , 4, 6,8

51
Mean Squared Error
MSE
?
?
52
Iso-contours of fit surface
Iso-contour of actual function
?
?
? (deg)
? (deg)
53
DACE fit for Pitching Moment Data Predictions are
at untried points
Cm
?
?
54
Mean Squared Error
MSE
?
?
55
Iso-contours of fit surface
Iso-contour of actual function
?
?
? (deg)
? (deg)
56
Review of MDO for Aerospace Vehicles

McQuade Ph.D thesis Univ. of Washington, 1991
Aerodynamic optimization of a 2D scramjet
vehicle using CFD (Euler).
Fore-body and Nozzle were separately optimized
to maximize thrust.

Engg. Models used Oblique Shock theory, 1D
Heat Addition, MOC
correction factors based on 2D CFD (Euler)
analysis (GLA)

57
General Application of Global-Local Approximation
Approximate Problem formulation
Complete Optimization ( 1
iteration)
No
Convergence?
Yes
stop
58
Review of MDO for Aerospace Vehicles
Afterbody Optimization
Objective maximize the net thrust Subject to
constraints on geometric parameters CFD , 1D
isentropic flow, MOC Taylor Series, GLA using
1D, GLA using MOC
59
Review of MDO for Aerospace Vehicles
Afterbody Optimization
Results
60
Review of MDO for Aerospace Vehicles
Fore-body Optimization
Objective maximize the net thrust Subject to
constraints on geometric parameters CFD ,
Oblique shock theory Taylor Series, GLA based on
Oblique shock
61
Review of MDO for Aerospace Vehicles
MDO of Air Breathing Hypersonic Vehicle
Ref Bowcutt J.of Propulsion and Power ,
Nov-Dec,2001
Optimization of Vehicle Configuration for
performance (range) across a specified Mach No.
vs Altitude Trajectory

Sizing
Aerodynamics
Stability Control
Propulsion
Trajectory

Optimization variables nose angle, engine
axial location,
engine cant, cowl length and
chine length

62
Review of MDO for Aerospace Vehicles
Key changes in the Optimized vehicle configuration

Engine location moved forward by 6 of vehicle
length
Engine cant reduced by 2 deg
Engine cowl length reduced by 5 of vehicle
length
Chine length reduced by 80 of vehicle length

The optimized vehicle, flying the same M-q
trajectory as the baseline, achieved 46
greater air-breathing range 9 improvement in
effective specific impulse 13 reduction in trim
drag over the baseline configuration

63
Review of MDO for Aerospace Vehicles
Aerodynamic Lessons

Wind tunnel testing and CFD analysis was
performed on the
Optimized vehicle
HABP like Engg. Codes overpredicted lower surface
pressures in
the aft region of the vehicle.
Vehicle range reduced by 6 based on W/T
Aerodynamics.
Vehicle instability levels in terms of negative
static margin increased
resulting in reduction in max. flight dynamic
pressure at which the
vehicle could operate.

64
Review of MDO for Aerospace Vehicles
Hall mark of MDO
Range sensitivities to the five vehicle design
parameters
Parameter Derivative
A variation that is detrimental by itself can be
beneficial when working in concert with many
coupled variations.
65
Review of MDO for Aerospace Vehicles

John Robert Olds , Ph.D. thesis NCSU, 1993
Advanced Space Transportation Vehicle optimized
for minimum weight.
Taguchi methods was used to select initial
experimental arrays. Parametric
methods were used to determine the settings
for design variables which
minimized weight. The effect noise
variables on the objective function was
included to ensure a robust design .
Central Composite Design was used for the
final design variables .
Quadratic Response surface was created using
RSM
Non-linear optimizer was used to optimize the
quadratic surface
Remarks
Parametric methods are useful only for very
early design stages where the
number of design variable are very few.
Initial problem size 8 design variables
Final problem size 3 design variables
Inclusion of design constraints in the frame
work is not easy.

66
Review of MDO for Aerospace Vehicles

Giunta , Ph.D thesis VPI SU , 1997
HSCT configuration optimized for TOGW.
Variable Complexity Response Surface Modeling.
Low fidelity methods used to screen the original
design space.
Response Surfaces (polynomial based) using
medium fidelity analysis created
for the reduced design space.
RSMs were used for function evaluations in the
optimizer.
Preliminary investigation on the use of Design
of Computer Experiments
(Kriging) for creating response surfaces was
also carried out.

Remarks
RSM help to smoothen out the numerical noise in
analysis methods. This ensures that
the gradient calculations (search directions )
are not affected.
Constraints from aerodynamics, propulsion,
stability, performance.
Methodology demonstrated for problem sizes of 5
to 20 design variables.
Curse of dimensionality limits the problem size.
Further studies are needed to investigate the
capabilities of DACE modeling.

67
Review of MDO for Aerospace Vehicles