11 KiB
11 KiB
Engine Design Guide
Overview
The Engine Design tool calculates rocket engine performance, material erosion, and structural requirements. It integrates combustion thermodynamics, ablative material degradation, and hoop stress analysis into a unified interface.
Main Sections
Combustion Design
Configure chamber, nozzle, and propellant properties to predict thrust, Isp, and exit conditions.
Ablative Erosion
Model chamber liner erosion based on pressure-dependent rates and propellant choice.
Structural Sizing
Calculate wall thicknesses and component masses using hoop stress formula.
Combustion Design
Inputs
Chamber:
chamberPressure(MPa) — combustion chamber pressurenozzleDiameter(mm) — nozzle throat diameterexpansionRatio— nozzle exit / throat area ratiodivergenceAngle(°) — nozzle divergence cone angle
Propellant Selection:
fuelType— dropdown (RP1, Methane, Hydrogen, etc.)oxidiserType— dropdown (LOX, N2O4, etc.)- Note: Propellant properties come from knowledgebase (T0, gamma, Mw, etc.)
Design Options:
injectorType— impingement, shower-head, multi-elementcoolingMethod— none, regenerative (future)nozzleShape— conical (15-20°), bell curve (optional)
Outputs (Computed)
Performance:
thrustVacuum(kN) — vacuum thrust (accounting for exit pressure)thrustSeaLevel(kN) — sea level thrust (accounting for ambient pressure)specificImpulseVacuum(s) — Isp in vacuumspecificImpulseSeaLevel(s) — Isp at sea levelcharacteristicVelocity(m/s) — c* = P0·At / ṁ
Combustion Conditions:
chamberTemperature(K) — adiabatic flame temperatureexitTemperature(K) — nozzle exit temperaturemachNumber— exit Mach number (computed via bisection)exitPressure(MPa) — nozzle exit pressureexitDensity(kg/m³) — exhaust density at exit
Nozzle Geometry:
throatDiameter(mm) — computed from chamber P, thrust, mass flowexitDiameter(mm) — exit diameter = throat × √(expansionRatio)nozzleLength(mm) — divergence section lengththrustCoefficient— CF (thrust coefficient for flow)
Flow Properties:
massFlowRate(kg/s) — propellant mass flow rateexitVelocity(m/s) — effective exhaust velocityburnRate(mm/s) — for propellant grain design
Key Equations
Thrust (from area and pressure):
F = P0·At·CF + (Pe - P_ambient)·Ae
Where CF is thrust coefficient from isentropic relations.
Specific Impulse:
Isp = Ve / g0
Isp_sl = (Ve - (Pe - P_atm) / ṁ · Ae) / g0
Exit Temperature (isentropic flow):
Te = T0 · (Pe / P0)^((γ-1)/γ)
Mass Flow Rate (from energy balance):
ṁ = P0 · At / c*
c* = √(2·(γ+1)/(γ-1) · R·T0) for ideal nozzle
Characteristic Velocity:
c* = √(2·(γ+1)/(γ-1) · R·T0 · (2/(γ+1))^((γ+1)/(γ-1)))
Ablative Erosion (v2)
Material Properties
Each ablative material in the knowledgebase has:
- Density (kg/m³) — ablator material density
- Base Erosion Rate (inch/s) — reference erosion at standard pressure (typically 300 psi)
- Pressure Exponent (n) — power-law sensitivity to pressure
Pressure-Corrected Erosion
The key innovation of v2 is pressure-dependent erosion rates:
erosion_rate(P) = base_rate · (P / P_ref)^n
Where:
base_rate— from material database (inch/s @ 300 psi)P— chamber pressure (Pa)P_ref— reference pressure (300 psi = 2.068 MPa)n— pressure exponent (material-specific)
Pressure Exponents by Material Class
Composites:
- PAXS (polyester/glass): n = 0.38
- KFSI (silica/phenolic): n = 0.35
- Carbon phenolic: n = 0.32
Elastomers:
- ZIRCONIA (zirconia/silicone): n = 0.48
- Butyl rubber: n = 0.50
Theory: Lower n = less pressure-sensitive (better for high-P engines)
Example Calculation
Material: PAXS, base_rate = 0.025 in/s, n = 0.38
At different pressures:
- 300 psi: rate = 0.025 × (300/300)^0.38 = 0.025 in/s
- 500 psi: rate = 0.025 × (500/300)^0.38 = 0.032 in/s
- 1000 psi: rate = 0.025 × (1000/300)^0.38 = 0.042 in/s
- 1500 psi: rate = 0.025 × (1500/300)^0.38 = 0.050 in/s
Erosion Calculation
Inputs:
- Chamber pressure (Pa)
- Burn time (s)
- Ablative material (from dropdown)
- Initial liner thickness (mm)
Process:
- Look up material properties (base_rate, n)
- Calculate pressure factor:
(P / P_ref)^n - Apply correction:
effective_rate = base_rate × factor - Erosion depth:
erosion = effective_rate × burn_time - Remaining thickness:
remaining = initial - erosion
Display:
- Pressure factor (if not 1.0)
- Corrected erosion rate (inch/s)
- Erosion depth (inch)
- Remaining thickness (inch)
- Warning if remaining < 0.5 inch
Thermal Analysis (Future)
Currently, erosion is purely mechanical. Future versions could include:
- Heat flux calculation
- Material melting/sublimation
- Thermal diffusion into structure
- Combined mechanical + thermal erosion
Structural Sizing
Material Selection
Choose from STRUCTURAL_MATERIALS array:
- Aluminum 6061-T6: Low density, corrosion-resistant
- Stainless Steel 304: High temp, corrosion-resistant
- Inconel 718: High strength at elevated T
- Titanium 6-4: Light, strong, expensive
- CFRP (Carbon Fiber): Highest strength-to-weight
Each has: density (kg/m³), yield strength (MPa), Young's modulus, CTE, limits
Hoop Stress Formula
For thin-walled cylinders:
σ_hoop = (P × r) / t
Solving for wall thickness with safety factor:
t = (P × r) / (σ_yield / SF)
Where:
P— internal pressure (Pa)r— radius (m)σ_yield— material yield strength (Pa)SF— safety factor (typical: 2.0–4.0)
Component Sizing
Chamber:
- Pressure: P0 (combustion pressure)
- Radius: determined by geometry
- Thickness:
t_chamber = (P0 × r) / (σ_y / SF)
Convergent Section (nozzle entrance):
- Pressure: P0 (full chamber pressure)
- Radius: smaller than chamber (converging)
- Thickness: similar to chamber
Throat (narrowest point):
- Pressure: ~P0 (highest local stress)
- Radius: throat_radius (smallest)
- Result: highest stress → thickest wall
- Thickness:
t_throat = (P0 × r_throat) / (σ_y / SF)
Divergent Section (nozzle expansion):
- Pressure: decreases from P0 to Pe
- Radius: increasing
- Thickness: typically uses Pe ≈ 0.1·P0 for design
- Lower thickness than chamber
Exit (atmospheric nozzle):
- Pressure: near ambient
- Thickness: minimal (can be thin-walled)
Mass Calculation
Cylindrical section:
m = 2π·r·t·L·ρ
Hemispherical dome (for tanks):
m = 4π·r²·t·ρ
Frustum (truncated cone):
m ≈ π·(r1·L + r2·L)·t·ρ (simplified)
Total engine dry mass:
m_dry = m_chamber + m_convergent + m_nozzle + m_injector_plate + m_misc
UI Layout
Left Panel (Inputs):
- Material dropdown
- Safety factor slider
- Pressure specifications (chamber, ambient)
Right Panel (Results):
- Wall thickness breakdown (chamber, throat, exit)
- Mass breakdown (chamber, convergent, divergent, injector, total)
- Material properties (yield, density, limit temp)
- Stress utilization (if known)
Workflow Example: Design LOX/RP1 Engine
Step 1: Set Combustion Conditions
- Select
fuelType = RP1 - Select
oxidiserType = LOX - Set
chamberPressure = 200 bar - Set
nozzleDiameter = 50 mm - Set
expansionRatio = 8→ Result: Thrust ≈ 150 kN, Isp ≈ 310 s
Step 2: Design Ablation
- Select
ablativeMaterial = PAXS - Set
initialLinertThickness = 10 mm - Set
burnTime = 60 s→ Result: Erosion ≈ 1.5 mm, Remaining ≈ 8.5 mm (OK)
Step 3: Size Structure
- Select
structuralMaterial = Inconel718 - Set
safetyFactor = 3.0→ Result:
- Chamber wall: 2.1 mm
- Throat wall: 2.8 mm
- Divergent: 1.5 mm
- Total dry mass: 2.3 kg
Step 4: Export
- Export as JSON: Download engine specs
- Import into rocket design tool
- Calculate vehicle TWR, delta-v, etc.
Advanced Topics
Regenerative Cooling
Not yet implemented, but conceptually:
- Propellant flows through cooling jackets before injection
- Removes heat from chamber walls
- Allows higher chamber pressure or thinner walls
- Adds complexity (adds ~0.5 kg per engine)
Implementation would add:
- Cooling jacket dimensions
- Heat transfer correlation (Dittus-Boelert, etc.)
- Pressure drop calculation
- Temperature rise of propellant
Ablator Recession Modeling
Current model assumes uniform erosion. Advanced model would include:
- Surface recession rate (different from bulk erosion)
- Spallation (chunks breaking off at high pressure)
- Chemical reaction (oxidation, decomposition)
- Thermal gradient (erosion depends on depth)
This requires:
- Heat conduction equation (PDE)
- Boundary conditions (heat flux from combustion)
- Material properties (k, cp, melt point)
- Solver (e.g., finite difference)
Combustion Instability
Not modeled currently, but factors affecting it:
- Injector design (pattern, element size, momentum ratio)
- Chamber L (characteristic length)* = V / At
- Higher L* = more residence time = higher c*
- Typical range: 30–60 inches
- Baffle plates (reduce acoustic resonance)
Knowledgebase Integration
Accessing Propellant Data
- Knowledgebase → Fuels / Oxidisers
- View all available propellants
- Copy properties into engine design
Accessing Material Data
- Knowledgebase → Structural Materials
- Compare yield strengths, densities, costs
- Select best for your application
Ablative Materials
- Knowledgebase → Ablative Materials
- View pressure exponents
- Notes on applications (chamber, nozzle, etc.)
Troubleshooting
Chamber pressure seems too high / low?
- Check propellant selection (wrong fuel/oxidizer?)
- Verify chamber geometry (radius, length)
- Check for typos in input values
Erosion warning?
- Select ablator with lower pressure exponent (more stable)
- Reduce chamber pressure if possible
- Increase initial liner thickness
- Shorten burn time
Structural mass too heavy?
- Switch to lighter material (Ti-6-4 vs SS)
- Reduce safety factor (if acceptable for design)
- Increase chamber pressure radius (less stress)
- Use thinner walls for non-critical sections
References
- Huzel, D. K., & Huang, D. H. (1992). Modern engineering for design of liquid-propellant rocket engines. AIAA.
- NASA SP-273: Liquid Rocket Engine Combustion Instability. (PDF)
- Crespo, A., & Liñán, A. (1975). Asymptotic analysis of unsteady flame oscillations in liquid propellant rocket motors. SIAM Journal on Applied Mathematics, 29(3), 521–533.
Last Updated: 2025-02 | Status: Current (v2 — Pressure-Corrected Ablation)