1 Emittance Calculation Progress and Plans Chris Rogers Analysis PC 18 August 2005.
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Transcript of 1 Emittance Calculation Progress and Plans Chris Rogers Analysis PC 18 August 2005.
2
Overview• Talk in detail about how we can do the emittance
calculation– Sample bunch
– Remove experimental error (PID & tracking)
– Calculate Emittance
• Talk about other useful quantities– Scraping/Aperture
– Decay Losses
– Single Particle Emittance
– Single Particle Amplitude
– Holzer Particle Number
3
Emittance(z)+/- error
Uimeas
Sampled bunch
Monte Carlo
PID
Vmeas
~ Calculate
Vtrue
Emittance Calculation RoadmapUnderstood, tools exist
Roughly understood
Not really understood
I’ll run through each box in this talk
4
Beam Matching• The cooling channel is designed to accept a certain
distribution of particles– The beta function should be periodic over a cell of the magnetic
field
– The beta function should be a minimum in the liquid Hydrogen for optimal cooling
– The longitudinal distribution should be realistic for the appropriate phase rotation system
• My standard approach is to – Do a reasonable job with the beamline (for good efficiency)
– Then sample a Gaussian distribution from the available events for the final analysis (Algorithm not implemented in G4MICE)
• Assign each muon some statistical weight w
• Matching Condition is usually ( = (333 mm, 0) in the upstream tracker solenoid (MICE Stage VI)– Need to check for different MICE stages
5
Sampling a bunch - stupid algorithm
• Stupid algorithm already exists but fails– Bin particles
– Density, bin = nbin/(bin area)
– Apply statistical weight to all particles in bin• Wbin= requiredbin
• Fails because number events in each bin goes as– With 106 particles and 10 bins/dimension we have ~ 1
particle in each bin– Atrocious precision
measn n2
6
Sampling a Bunch - clever algorithm
1. Bin ito single particle emittance/amplitude (I.e. 1D) – Use the covariance matrix of the desired distribution
2. Then reweight so that the distributions inside each SPE bin are flat in phase space
• Not coded yet• Stage 2 should be easy but I haven’t quite worked out the
details yet– Rotate the bunch and take successive 1D histograms to avoid the
binning problem in the stupid algorithm
– E.g. for a 2D phase space, if the distribution is flat in x and flat in px
and flat in (x+px) then it will be flat in 2D phase space
• May be productive to develop a measure of “Gaussian-ness”– There’s >~ 3 months work here!
8
Vmeas
• We then calculate the covariance matrix using
– Where ui are the measured phase space coords, and w is the statistical weight
– I haven’t specified whether we use px or x’=px/pz type variables
• Recall emittance is related to the determinant of the 2N dimensional covariance matrix according to
– Where the additional factor of <pz> is required if we use x’ type variables to normalise the emittance
muonsj
muonsi
muonsjiij wu
wwu
wuwu
wV
111
Nn m
21V
Nzn m
p 2 V
or
9
Vtrue
• This gives us the measured covariance matrix– Includes errors due to mis-PID– Includes errors due to detector resolutions
• Correct for detector resolutions– Detector resolution introduces an offset in emittance– If we can characterise our detector resolutions well, we can understand and
correct the offset
• Correct for mis-PID (new!)– Mis-PID also introduces an offset– If we can characterise our PID and beam well, we can also correct this offset– This is a new idea sparked by discussion with Rikard at the last CM - disclaimer
is I only looked at it on Tuesday after getting back from my holidays … still very immature ideas
10
Measurement Error
• The measured value uimeas of a true value uitrue has the relation:
– Where i is a small error.
• The expression for Vtrue can then be written in terms of the measured parameters:
• For a bit more detail see MICE Note 90 (tracker note)
• This is similar to addition in quadrature, except that the error is not independent of the phase space coordinates
itruei
measi uu
CRRVV Tnn meas2
true2
13
Calculating the Error• We can get the offset from G4MICE, but IMHO this is not enough
– Monte Carlo can be wrong
– We should be prepared to expect the unexpected
• I would be happier if we could calculate/explain the pdf of the errors i depending on the source of the error– Dead fibres
– Misalignment
– Multiple scattering
– Other stuff
• So, for example, if one of the fibres dies during the experiment we can spot it– Or whatever
14
PID
• I included a brief note on how PID effects our experimental measurement– Some mathematical detail that may make this more suitable as a
document rather than slides
15
Emittance Calculation
• Finally calculate the emittance according to the formula given in slide 7
• Technical note about units– Everyone quotes emittance as being something like 6 mm rad
– This is because the area of an ellipse in 2D phase space is
– But a 2n dimensional hyperellipsoid has volume given by
– With
– So strictly speaking the units mm rad are wrong, and we should instead use mm rad
• For simplicity I ignore this
|| 2VArea
|| 22 nngVolume V
)1(2 ng
n
n
volumen
nn g 2
16
More on Units• Everyone says that emittance conservation is a consequence of Liouville• But Liouville’s Theorem refers to canonical phase space coordinates
such as
• I have yet to see this relationship done “properly” in the literature• Two coordinate sets seem to be in use in accelerator physics
– Trace space (t,x,y,dt/dz,dx/dz,dy/dz)• More common
– Kinetic phase space (t,x,y,E,px,py)
• Less common, Ecalc9 uses it
• I’ve been using it as the default for compatibility with ICOOL
– I can use either in G4MICE Analysis
c
qAp
c
qAp
c
qEyxt y
yx
x ,,,,,
U
17
Related Quantities - Scraping• There exists a closed surface in phase space beyond which particles
strike the walls– Surface in 6D phase space!
• We should be able to measure this surface– Transmission, radiation damage, ?dynamic aperture?, ?rf aperture?
• We should be able to measure the effects on the muon of striking the walls– Are all particles lost?
• This means that we must have sufficient acceptance in the detectors etc that the entire scraped surface makes it to the first absorber
• It would also be useful to distinguish between scraping losses and decay losses– Is this possible
18
Related Quantities - Decay Losses• We may also want to get at decay losses
• Expect ~ 20% or more loss in a FS2 style neutrino factory cooling channel due to decays
• But should be easily calculable
19
Related Quantities - SPE• Single Particle Emittance i
– V is the matrix of covariances
– U is particle position
– O is the matrix of measured optical functions , , etc• V=nO
– Can be calculated in G4MICE Analysis
UOUUVUni11
SPE is area of this ellipse
Position of particle
RMS contour of bunch
20
Constancy of SPE• Fire a 5 beam through MICE stage VI with only
magnetic fields– No RF/liquid Hydrogen
– Individual SPE’s change by ~10 %, <SPE> ~ constant
21
Cooling ito SPE
• Now add RF (electrostatic?) and LH2
– Note <SPE> decreases by ~10% … Cooling!! (~<SPE>/2n)
22
Related Quantities - SPA• SPA single particle amplitude
– Use calculated optical functions– SPE-like quantity independent of bunch measurement– Can be calculated in G4MICE Analysis
• One powerful use of this method is to look at phase space without requiring any bunch– Good for simulation– Possibly use as an experimental technique?– Get much higher statistics in particular regions of phase space
• Get back to “bunch amplitude” ~ bunch emittance– Use
n
AA bunch
2
22
23
Example use - nonlinear optics
• Build grid in phase space
• Fire it through MICE magnetic fields– Examine change in amplitude upstream vs
downstream
A2
A2/A2
24
Some more A2 plots
• Show (SPE) independent of the rest of phase space
Initial x
Final pzInitial px
25
Related Quantities - Holzer
• Calculate the maximum number of particles sitting in an arbritrary hyper-ellipsoid of a given volume– Holzer suggests using a minimising algorithm to find the hyper-
ellipsoid of a particular volume that has the most particles in it
– To first approximation, this will be similar to the hyper-ellipsoid given by UTV-1U
– Then this becomes the number of particles with SPE lower than some value ~ the volume of the hyper-ellipsoid
26
Overview• This is all I know about Analysis!
• Detailed outline of how to do the emittance calculation– Sample bunch
– Remove experimental error (PID & tracking)
– Calculate Emittance
• Talked about other useful quantities– Scraping/Aperture
– Decay Losses
– Single Particle Emittance
– Single Particle Amplitude
– Holzer Particle Number