public class EcksteinHechlerPropagator extends AbstractAnalyticalPropagator
SpacecraftState
using the analytical Eckstein-Hechler model.
The Eckstein-Hechler model is suited for near circular orbits (e < 0.1, with poor accuracy between 0.005 and 0.1) and inclination neither equatorial (direct or retrograde) nor critical (direct or retrograde).
Note that before version 7.0, there was a large inconsistency in the generated
orbits, and it was fixed as of version 7.0 of Orekit, with a visible side effect.
The problems is that if the circular parameters produced by the Eckstein-Hechler
model are used to build an orbit considered to be osculating, the velocity deduced
from this orbit was inconsistent with the position evolution! The reason is
that the model includes non-Keplerian effects but it does not include a corresponding
circular/Cartesian conversion. As a consequence, all subsequent computation involving
velocity were wrong. This includes attitude modes like yaw compensation and Doppler
effect. As this effect was considered serious enough and as accurate velocities were
considered important, the propagator now generates Cartesian
orbits
which are built in a special way to ensure consistency throughout propagation.
A side effect is that if circular parameters are rebuilt by user from these propagated
Cartesian orbit, the circular parameters will generally not match the initial
orbit (differences in semi-major axis can exceed 120 m). The position however will
match to sub-micrometer level, and this position will be identical to the positions
that were generated by previous versions (in other words, the internals of the models
have not been changed, only the output parameters have been changed). The correctness
of the initialization has been assessed and is good, as it allows the subsequent orbit
to remain close to a numerical reference orbit.
If users need a more definitive initialization of an Eckstein-Hechler propagator, they
should consider using a propagator converter
to initialize their Eckstein-Hechler propagator using a complete
sample instead of just a single initial orbit.
Orbit
DEFAULT_LAW, DEFAULT_MASS, EPHEMERIS_GENERATION_MODE, MASTER_MODE, SLAVE_MODE
Constructor and Description |
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EcksteinHechlerPropagator(Orbit initialOrbit,
AttitudeProvider attitudeProv,
double referenceRadius,
double mu,
double c20,
double c30,
double c40,
double c50,
double c60)
Build a propagator from orbit, attitude provider and potential.
|
EcksteinHechlerPropagator(Orbit initialOrbit,
AttitudeProvider attitudeProv,
double mass,
double referenceRadius,
double mu,
double c20,
double c30,
double c40,
double c50,
double c60)
Build a propagator from orbit, attitude provider, mass and potential.
|
EcksteinHechlerPropagator(Orbit initialOrbit,
AttitudeProvider attitudeProv,
double mass,
UnnormalizedSphericalHarmonicsProvider provider)
Build a propagator from orbit, attitude provider, mass and potential provider.
|
EcksteinHechlerPropagator(Orbit initialOrbit,
AttitudeProvider attitude,
double mass,
UnnormalizedSphericalHarmonicsProvider provider,
UnnormalizedSphericalHarmonicsProvider.UnnormalizedSphericalHarmonics harmonics)
Private helper constructor.
|
EcksteinHechlerPropagator(Orbit initialOrbit,
AttitudeProvider attitudeProv,
UnnormalizedSphericalHarmonicsProvider provider)
Build a propagator from orbit, attitude provider and potential provider.
|
EcksteinHechlerPropagator(Orbit initialOrbit,
double referenceRadius,
double mu,
double c20,
double c30,
double c40,
double c50,
double c60)
Build a propagator from orbit and potential.
|
EcksteinHechlerPropagator(Orbit initialOrbit,
double mass,
double referenceRadius,
double mu,
double c20,
double c30,
double c40,
double c50,
double c60)
Build a propagator from orbit, mass and potential.
|
EcksteinHechlerPropagator(Orbit initialOrbit,
double mass,
UnnormalizedSphericalHarmonicsProvider provider)
Build a propagator from orbit, mass and potential provider.
|
EcksteinHechlerPropagator(Orbit initialOrbit,
UnnormalizedSphericalHarmonicsProvider provider)
Build a propagator from orbit and potential provider.
|
Modifier and Type | Method and Description |
---|---|
protected double |
getMass(AbsoluteDate date)
Get the mass.
|
CartesianOrbit |
propagateOrbit(AbsoluteDate date)
Extrapolate an orbit up to a specific target date.
|
void |
resetInitialState(SpacecraftState state)
Reset the propagator initial state.
|
protected void |
resetIntermediateState(SpacecraftState state,
boolean forward)
Reset an intermediate state.
|
acceptStep, addEventDetector, basicPropagate, clearEventsDetectors, getEventsDetectors, getGeneratedEphemeris, getPvProvider, propagate
addAdditionalStateProvider, getAdditionalStateProviders, getAttitudeProvider, getFixedStepSize, getFrame, getInitialState, getManagedAdditionalStates, getMode, getPVCoordinates, getStartDate, getStepHandler, initializePropagation, isAdditionalStateManaged, propagate, setAttitudeProvider, setEphemerisMode, setEphemerisMode, setMasterMode, setMasterMode, setSlaveMode, setStartDate, stateChanged, updateAdditionalStates
clone, equals, finalize, getClass, hashCode, notify, notifyAll, toString, wait, wait, wait
getDefaultLaw
@DefaultDataContext public EcksteinHechlerPropagator(Orbit initialOrbit, UnnormalizedSphericalHarmonicsProvider provider)
Mass and attitude provider are set to unspecified non-null arbitrary values.
This constructor uses the default data context
.
initialOrbit
- initial orbitprovider
- for un-normalized zonal coefficientsEcksteinHechlerPropagator(Orbit, AttitudeProvider,
UnnormalizedSphericalHarmonicsProvider)
public EcksteinHechlerPropagator(Orbit initialOrbit, AttitudeProvider attitude, double mass, UnnormalizedSphericalHarmonicsProvider provider, UnnormalizedSphericalHarmonicsProvider.UnnormalizedSphericalHarmonics harmonics)
initialOrbit
- initial orbitattitude
- attitude providermass
- spacecraft massprovider
- for un-normalized zonal coefficientsharmonics
- provider.onDate(initialOrbit.getDate())
@DefaultDataContext public EcksteinHechlerPropagator(Orbit initialOrbit, double referenceRadius, double mu, double c20, double c30, double c40, double c50, double c60)
Mass and attitude provider are set to unspecified non-null arbitrary values.
The Cn,0 coefficients are the denormalized zonal coefficients, they are related to both the normalized coefficients Cn,0 and the Jn one as follows:
Cn,0 = [(2-δ0,m)(2n+1)(n-m)!/(n+m)!]½ Cn,0
Cn,0 = -Jn
This constructor uses the default data context
.
initialOrbit
- initial orbitreferenceRadius
- reference radius of the Earth for the potential model (m)mu
- central attraction coefficient (m³/s²)c20
- un-normalized zonal coefficient (about -1.08e-3 for Earth)c30
- un-normalized zonal coefficient (about +2.53e-6 for Earth)c40
- un-normalized zonal coefficient (about +1.62e-6 for Earth)c50
- un-normalized zonal coefficient (about +2.28e-7 for Earth)c60
- un-normalized zonal coefficient (about -5.41e-7 for Earth)Constants
,
EcksteinHechlerPropagator(Orbit, AttitudeProvider, double, double, double,
double, double, double, double, double)
@DefaultDataContext public EcksteinHechlerPropagator(Orbit initialOrbit, double mass, UnnormalizedSphericalHarmonicsProvider provider)
Attitude law is set to an unspecified non-null arbitrary value.
This constructor uses the default data context
.
initialOrbit
- initial orbitmass
- spacecraft massprovider
- for un-normalized zonal coefficientsEcksteinHechlerPropagator(Orbit, AttitudeProvider, double,
UnnormalizedSphericalHarmonicsProvider)
@DefaultDataContext public EcksteinHechlerPropagator(Orbit initialOrbit, double mass, double referenceRadius, double mu, double c20, double c30, double c40, double c50, double c60)
Attitude law is set to an unspecified non-null arbitrary value.
The Cn,0 coefficients are the denormalized zonal coefficients, they are related to both the normalized coefficients Cn,0 and the Jn one as follows:
Cn,0 = [(2-δ0,m)(2n+1)(n-m)!/(n+m)!]½ Cn,0
Cn,0 = -Jn
This constructor uses the default data context
.
initialOrbit
- initial orbitmass
- spacecraft massreferenceRadius
- reference radius of the Earth for the potential model (m)mu
- central attraction coefficient (m³/s²)c20
- un-normalized zonal coefficient (about -1.08e-3 for Earth)c30
- un-normalized zonal coefficient (about +2.53e-6 for Earth)c40
- un-normalized zonal coefficient (about +1.62e-6 for Earth)c50
- un-normalized zonal coefficient (about +2.28e-7 for Earth)c60
- un-normalized zonal coefficient (about -5.41e-7 for Earth)EcksteinHechlerPropagator(Orbit, AttitudeProvider, double, double, double,
double, double, double, double, double)
public EcksteinHechlerPropagator(Orbit initialOrbit, AttitudeProvider attitudeProv, UnnormalizedSphericalHarmonicsProvider provider)
Mass is set to an unspecified non-null arbitrary value.
initialOrbit
- initial orbitattitudeProv
- attitude providerprovider
- for un-normalized zonal coefficientspublic EcksteinHechlerPropagator(Orbit initialOrbit, AttitudeProvider attitudeProv, double referenceRadius, double mu, double c20, double c30, double c40, double c50, double c60)
Mass is set to an unspecified non-null arbitrary value.
The Cn,0 coefficients are the denormalized zonal coefficients, they are related to both the normalized coefficients Cn,0 and the Jn one as follows:
Cn,0 = [(2-δ0,m)(2n+1)(n-m)!/(n+m)!]½ Cn,0
Cn,0 = -Jn
initialOrbit
- initial orbitattitudeProv
- attitude providerreferenceRadius
- reference radius of the Earth for the potential model (m)mu
- central attraction coefficient (m³/s²)c20
- un-normalized zonal coefficient (about -1.08e-3 for Earth)c30
- un-normalized zonal coefficient (about +2.53e-6 for Earth)c40
- un-normalized zonal coefficient (about +1.62e-6 for Earth)c50
- un-normalized zonal coefficient (about +2.28e-7 for Earth)c60
- un-normalized zonal coefficient (about -5.41e-7 for Earth)public EcksteinHechlerPropagator(Orbit initialOrbit, AttitudeProvider attitudeProv, double mass, UnnormalizedSphericalHarmonicsProvider provider)
initialOrbit
- initial orbitattitudeProv
- attitude providermass
- spacecraft massprovider
- for un-normalized zonal coefficientspublic EcksteinHechlerPropagator(Orbit initialOrbit, AttitudeProvider attitudeProv, double mass, double referenceRadius, double mu, double c20, double c30, double c40, double c50, double c60)
The Cn,0 coefficients are the denormalized zonal coefficients, they are related to both the normalized coefficients Cn,0 and the Jn one as follows:
Cn,0 = [(2-δ0,m)(2n+1)(n-m)!/(n+m)!]½ Cn,0
Cn,0 = -Jn
initialOrbit
- initial orbitattitudeProv
- attitude providermass
- spacecraft massreferenceRadius
- reference radius of the Earth for the potential model (m)mu
- central attraction coefficient (m³/s²)c20
- un-normalized zonal coefficient (about -1.08e-3 for Earth)c30
- un-normalized zonal coefficient (about +2.53e-6 for Earth)c40
- un-normalized zonal coefficient (about +1.62e-6 for Earth)c50
- un-normalized zonal coefficient (about +2.28e-7 for Earth)c60
- un-normalized zonal coefficient (about -5.41e-7 for Earth)public void resetInitialState(SpacecraftState state)
resetInitialState
in interface Propagator
resetInitialState
in class AbstractPropagator
state
- new initial state to considerprotected void resetIntermediateState(SpacecraftState state, boolean forward)
resetIntermediateState
in class AbstractAnalyticalPropagator
state
- new intermediate state to considerforward
- if true, the intermediate state is valid for
propagations after itselfpublic CartesianOrbit propagateOrbit(AbsoluteDate date)
propagateOrbit
in class AbstractAnalyticalPropagator
date
- target date for the orbitprotected double getMass(AbsoluteDate date)
getMass
in class AbstractAnalyticalPropagator
date
- target date for the orbitCopyright © 2002-2020 CS Group. All rights reserved.