Parameters characterizing the Parameters characterizing the Atmospheric Turbulence: rAtmospheric Turbulence: r00, , 00, , 00
François WildiObservatoire de Genève
Credit for most slides : Claire Max (UC Santa Cruz)
Adaptive Optics in the VLT and ELT eraAdaptive Optics in the VLT and ELT era
rr00 sets the number of sets the number of degrees of freedom of an AO degrees of freedom of an AO systemsystem
• Divide primary mirror into “subapertures” of diameter r0
• Number of subapertures ~ (D / r0)2 where r0 is evaluated at the desired observing wavelength
• Example: Keck telescope, D=10m, r0 ~ 60 cm at = m. (D / r0)2 ~ 280. Actual # for Keck : ~250.
About rAbout r00
• Define r0 as telescope diameter where optical transfer functions of the telescope and atmosphere are equal
• r0 is separation on the telescope primary mirror where phase correlation has fallen by 1/e
• (D/r0)2 is approximate number of speckles in short-exposure image of a point source
• D/r0 sets the required number of degrees of freedom of an AO system
• Timescales of turbulence• Isoplanatic angle: AO performance degrades as
astronomical targets get farther from guide star
A simplifying hypothesis about A simplifying hypothesis about time behaviortime behavior
• Almost all work in this field uses “Taylor’s Frozen Flow Hypothesis”– Entire spatial pattern of a random turbulent
field is transported along with the wind velocity– Turbulent eddies do not change significantly as
they are carried across the telescope by the wind
– True if typical velocities within the turbulence are small compared with the overall fluid (wind) velocity
• Allows you to infer time behavior from measured spatial behavior and wind speed:
Cartoon of Taylor Frozen FlowCartoon of Taylor Frozen Flow
• From Tokovinin tutorial at CTIO:
• http://www.ctio.noao.edu/~atokovin/tutorial/
Order of magnitude estimateOrder of magnitude estimate
• Time for wind to carry frozen turbulence over a subaperture of size r0 (Taylor’s frozen flow hypothesis):
00 ~ r ~ r00 / V / V
• Typical values:– = 0.5 m, r0 = 10 cm, V = 20 m/sec 0 = 5 msec– = 2.0 m, r0 = 53 cm, V = 20 m/sec 0 = 265 msec– = 10 m, r0 = 36 m, V = 20 m/sec 0 = 1.8 sec
• Determines how fast an AO system has to run
But But whatwhat wind speed should we wind speed should we use?use?
• If there are layers of turbulence, each layer can move with a different wind speed in a different direction!
• And each layer has different CN2
ground
V1
V4
V2
V3
Concept Question:Concept Question:What would be a plausible way to
weight the velocities in the different layers?
Rigorous expressions for Rigorous expressions for 0 0 take take into account different layersinto account different layers
• fG Greenwood frequency 1 / 0
• What counts most are high velocities V where CN2 is big
0 fG 1 0.102 k 2 sec dz C N
2 (z) V (z) 5 / 3
0
3 / 5
6 / 5
0 ~ 0.3 r0
V where V
dz CN2 (z) V (z) 5 / 3
dz CN2 (z)
3 / 5
Hardy § 9.4.3
Short exposures: speckle imagingShort exposures: speckle imaging
• A speckle structure appears when the exposure is shorter than the atmospheric coherence time 0
• Time for wind to carryfrozen turbulence overa subaperture of size r0
0 ~ 0.3(r0 /V wind )
Structure of an AO imageStructure of an AO image
• Take atmospheric wavefront
• Subtract the least square wavefront that the mirror can take
• Add tracking error
• Add static errors
• Add viewing angle
• Add noise
atmospheric turbulence + AOatmospheric turbulence + AO
• AO will remove low frequencies in the wavefront error up to f=D 2/n, where n is the number of actuators accross the pupil
• By Fraunhoffer diffraction this will produce a center diffraction limited core and halo starting beyond 2D/n
2D/n f
PSD()
The state-of-the art in performance:The state-of-the art in performance:
Diffraction limit resolution LBT FLAO PSF in H band. Composition of two 10s integration images. It is possible to count 10diffraction rings. The measured H band SR was at least 80%. The guide star has a mag of R =6.5, H=2.5 with a seeing of 0.9 arcsec V band correcting 400 KL modes
• Composite J, H, K band image, 30 second exposure in each band• Field of view is 40”x40” (at 0.04 arc sec/pixel)• On-axis K-band Strehl ~ 40%, falling to 25% at field corner
Anisoplanatism: how does AO image Anisoplanatism: how does AO image degrade as you move farther from degrade as you move farther from guide star?guide star?
credit: R. Dekany, Caltech
More about More about anisoplanatisanisoplanatism:m:
AO image of AO image of sun in visible sun in visible lightlight
11 second 11 second exposureexposureFair SeeingFair SeeingPoor high Poor high altitude altitude conditionsconditions
From T. From T. RimmeleRimmele
AO image of sun AO image of sun in visible light:in visible light:
11 second 11 second exposureexposure
Good seeingGood seeing
Good high Good high altitude altitude conditionsconditions
From T. RimmeleFrom T. Rimmele
What determines how close What determines how close the reference star has to be?the reference star has to be?
Turbulence has to be similar on path to reference star and to science object
Common path has to be large
Anisoplanatism sets a limit to distance of reference star from the science object
Reference Star ScienceObject
Telescope
Turbulence
z
Common Atmospheric
Path
Expression for isoplanatic angle Expression for isoplanatic angle 00
• Strehl = 0.38 at = 0
0 is isoplanatic angle
0 is weighted by high-altitude turbulence (z5/3)
• If turbulence is only at low altitude, overlap is very high.
• If there is strong turbulence at high altitude, not much is in common path
0 2.914 k 2(sec )8 / 3 dz CN2 (z) z5 / 3
0
3 / 5
Telescope
Common Path
Isoplanatic angle, continuedIsoplanatic angle, continued
• Simpler way to remember 0
0 0.314 cos r0
h where h
dz z5 / 3CN2 (z)
dz CN2 (z)
3 / 5
Hardy § 3.7.2
ReviewReview
• r0 (“Fried parameter”)
– Sets number of degrees of freedom of AO system
0 (or Greenwood Frequency ~ 1 / 0 )
00 ~ r ~ r00 / V / V where
– Sets timescale needed for AO correction
0 (or isoplanatic angle)
– Angle for which AO correction applies
V dz CN
2 (z) V (z) 5 /3
dz CN2 (z)
3/5
0 0.3 r0
h
where h dz z5 /3CN
2 (z)dz CN
2 (z)
3/5
How to characterize a wavefront How to characterize a wavefront that has been distorted by that has been distorted by turbulenceturbulence
• Path length difference z where kz is the phase change due to turbulence
• Variance 2 = <(k z)2 > • If several different effects
cause changes in the phase,
tot2 = k2 <(zz)2 >
= k2 <(z)2(z)2) >
tottot22 = = 11
2 2 + + 222 2 + + 33
22radiansradians22
or (or (z)z)2 2 = (= (zz11))22((zz22))22((zz33))2 2 nmnm22
Total wavefront errorTotal wavefront error for an AO for an AO system:system:
• List as many physical effects as you can that might contribute to overall wavefront error tottot
22
tottot22 = = 11
2 2 + + 222 2 + + 33
22
Elements of an adaptive optics Elements of an adaptive optics systemsystem
Phase lag, noise
propagation
DM fitting error
Measurement error
Not shown: tip-tilt error,
anisoplanatism error
Non-common path errors
Hardy Figure 2.32
• Wavefront phase variance due to 0 = fG-1
– If an AO system corrects turbulence “perfectly” but with a phase lag characterized by a time then
• Wavefront phase variance due to 0 – If an AO system corrects turbulence
“perfectly” but using a guide star an angle away from the science target, then
Wavefront errors due to Wavefront errors due to 00 , , 00
timedelay2 28.4
0
5 / 3
angle2
0
5 / 3
Hardy Eqn 9.57
Hardy Eqn 3.104
Deformable mirror fitting errorDeformable mirror fitting error
• Accuracy with which a deformable mirror with subaperture diameter d can remove aberrations
fittingfitting22 = = ( d / r ( d / r00 ) )5/35/3
• Constant depends on specific design of deformable mirror
• For segmented mirror that corrects tip, tilt, and piston (3 degrees of freedom per segment) = 0.14
• For deformable mirror with continuous face-sheet, = 0.28
Image motion or “tip-tilt” also Image motion or “tip-tilt” also contributes to total wavefront contributes to total wavefront errorerror
• Turbulence both blurs an image and makes it move around on the sky (image motion).– Due to overall “wavefront tilt” component of
the turbulence across the telescope aperture
• Can “correct” this image motion either by taking a very short time-exposure, or by using a tip-tilt mirror (driven by signals from an image motion sensor) to compensate for image motion
Angle of arrival fluctuations 2 0.364 Dr0
5 / 3D
2
0 D-1/3 (units : radians2)
(Hardy Eqn 3.59 - one axis) image motion in radians is indep of
Scaling of tip-tilt with Scaling of tip-tilt with and D: and D: the good news and the bad newsthe good news and the bad news
• In absolute terms, rms image motion in radians is independent of anddecreases slowly as D increases:
• But you might want to compare image motion to diffraction limit at your wavelength:
Now image motion relative todiffraction limit is almost ~ D, and becomes larger fraction of diffraction limit for small
2 1/ 20.6 D
r0
5 / 6D 0 D-1/6 radians
2 1/ 2
/D ~ D5/6
Effects of turbulence Effects of turbulence depend on size of depend on size of telescopetelescope
• Coherence length of turbulence: r0 (Fried’s parameter)• For telescope diameter D (2 - 3) x r0 :
Dominant effect is "image wander"• As D becomes >> r0 :
Many small "speckles" develop
• Computer simulations by Nick Kaiser: image of a star, r0 = 40 cm
D = 1 m D = 2 m D = 8 m
Error budget so farError budget so far
tottot22 = = fittingfitting
2 2 + + anisopanisop2 2 + + temporaltemporal
22 measmeas2 2 calibcalib
22
Still need to work on these two
√ √ √
Error Budgets: SummaryError Budgets: Summary
• Individual contributors to “error budget” (total mean square phase error):– Anisoplanatism anisopanisop
2 2 = (= ( / / 00 ) )5/35/3
– Temporal error temporaltemporal2 2 = 28.4 (= 28.4 ( / / 00 ) )5/35/3
– Fitting error fittingfitting2 2 = = ( d / r ( d / r00 ) )5/3 5/3
– Measurement error– Calibration error, .....
• In a different category: – Image motion <<22>>1/21/2 = 2.56 (D/r = 2.56 (D/r00))5/6 5/6 ((/D) /D)
radiansradians22
• Try to “balance” error terms: if one is big, no point struggling to make the others tiny
We want to relate phase variance We want to relate phase variance to the “Strehl ratio”to the “Strehl ratio”
• Two definitions of Strehl ratio (equivalent):– Ratio of the maximum intensity of a point
spread function to what the maximum would be without aberrations
– The “normalized volume” under the optical transfer function of an aberrated optical system
S OTFaberrated ( fx , fy )dfxdfy
OTFun aberrated ( fx , fy )dfxdfy
where OTF( fx , fy )Fourier Transform(PSF)
Examples of PSF’s and their Examples of PSF’s and their Optical Transfer FunctionsOptical Transfer Functions
Seeing limited PSF
Diffraction limited PSF
Inte
nsity
Inte
nsity
Seeing limited OTF
Diffraction limited OTF
/ r0
/ r0 / D
/ D r0 / D /
r0 / D /
-1
-1
1
1
Relation between variance and Relation between variance and StrehlStrehl
• “Maréchal Approximation”
– Strehl ~ exp(- 2)
where 2 is the total wavefront variance– Valid when Strehl > 10% or so– Under-estimate of Strehl for larger values
of 2