Post on 13-Jan-2016
Estimating currents and electric fields in the high-latitude ionosphere using ground- and
space-based observationsEllen Cousins1, Tomoko Matsuo2,3, Art Richmond1
1NCAR-HAO, 2CU-CIRES, 3NOAA-SWPC
FESD-ECCWES Meeting – 10 Feb 2014 1/13
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High-latitude Ionospheric Currents Currents from magnetosphere close through high-latitude ionosphere Drive currents parallel to and perpendicular to ionospheric electric field
(Pedersen & Hall currents)
E
E
Satellites sample magnetic perturbations
( field-aligned currents) SuperDARN radars sample
plasma drifts ( electric fields)
Goal: Combine the two data sets and estimate complete (2D) current & electric field distribution
FESD-ECCWES Meeting – 10 Feb 2014 2/13
[Brian Anderson]
Active Magnetosphere andPlanetaryElectrodynamics ResponseExperiment
AMPERE: Standard AMPERE: High~1° lat. res. ~ 0.1° lat. res.
3FESD-ECCWES Meeting – 10 Feb 2014
• Magnetometer on every satellite
• 6 orbit planes (12 cuts in local time) ~11 satellites/plane
• 9 minute spacing - re-sampling cadence
• 780 km altitude, circular, polar orbits
Iridium for Science
Using observations of
Inverse procedure to infer maps of
Assimilative Mapping of Ionospheric Electrodynamics [Richmond and Kamide, 1988]
Linear relationships (for a given Σ)
Given 2 of E, Σ, ΔB, can in theory solve for remaining variables
FESD-ECCWES Meeting – 10 Feb 2014 4/13
Electric field (from SuperDARN)
Conductance (height-integrated conductivity) – tensor(no observations for this study)
Magnetic pertubations(from AMPERE)
Ionospheric current density(no observations for this study)
- Electrostatic potential
- Field aligned current density ( )
xa – analysis
y – observations
xb – background model
H – forward operator
K – Kalman gain
Pb – background model error
covariance
R – observational error
covariance
Use the optimal interpolation (OI) method of data assimilation Optimally combine information from observations and a background model, taking into account error properties of both
xa = xb + K (y – H xb )
K = Pb HT (H Pb H
T + R)-1
FESD-ECCWES Meeting – 10 Feb 2014 5/13
Assimilative Mapping Procedure
[From EOF] [analysis]
[physics + Σ]
Use the optimal interpolation (OI) method of data assimilation Optimally combine information from observations and a background model, taking into account error properties of both
Background model and its error properties (from EOF analysis) previously determined for SuperDARN data
Recently did similar analysis for AMPERE data But only have 1 week of data (used years for SuperDARN analysis) Data quality issues
FESD-ECCWES Meeting – 10 Feb 2014 6/13
Assimilative Mapping Procedure
Calculated using just across-track component of ΔBEOF 2mean EOF 1
EOF 5EOF 3 EOF 4
EOF 2mean EOF 1
EOF 5EOF 3 EOF 4
Calculated using just along-track component of ΔB
Relative contribution of mean and each EOF to total observed ΔB2
(more flat spectrum)(more peaked spectrum)
FESD-ECCWES Meeting – 10 Feb 2014 7/13
AMPERE EOFs
xa – analysis
y – observations
xb – background model
H – forward operator
K – Kalman gain
Pb – background model error
covariance
R – observational error
covariance
Use the optimal interpolation (OI) method of data assimilation Optimally combine information from observations and a background model, taking into account error properties of both
xa = xb + K (y – H xb )
K = Pb HT (H Pb H
T + R)-1
FESD-ECCWES Meeting – 10 Feb 2014 8/13
[From EOF] [analysis]
[physics + Σ]
Assimilative Mapping Procedure
FESD-ECCWES Meeting – 10 Feb 2014 9/13
Ionospheric Conductance Height-integrated conductivity (tensor) Assumed infinite along magnetic field lines Pederson/Hall conductance || / to E
Solar-produced component Empirical model – assumed to be reasonably accurate
Auroral component unknown Highly variable in space and time Estimate using empirical model Could adjust using information from observations (have had limited success)
Night-side background level Less well known than day-side Use as fudge factor
€
⊥
SolarNoon45°
Auroral
Background
1st working with the two data sets separately – large disagreement Likely due to errors & biases in the data & errors in conductance model
FESD-ECCWES Meeting – 10 Feb 2014 10/13
Assimilative Mapping Examples
SuperDARN AMPERE Σbgd = 0.3
Σbgd = 3
Φ
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AMPERESuperDARN
More agreement if night-side conductance inflated to 3
Solving with both data sets simultaneously
FESD-ECCWES Meeting – 10 Feb 2014 11/13
Assimilative Mapping Examples
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FESD-ECCWES Meeting – 10 Feb 2014 12/13
Assimilative Mapping Examples
BY
BZ
AMPERE SuperDARN
FESD-ECCWES Meeting – 10 Feb 2014 13/13
Next Steps Validation, refinement of procedure by comparing mapped results to independent observations Have begun testing against subset of SuperDARN or AMPERE data excluded from fit
Look at geomagnetic disturbance within the week-long AMPERE data set