Lecture 2: Multipoles, Conformal Mapping, Pole tip...
Transcript of Lecture 2: Multipoles, Conformal Mapping, Pole tip...
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Mauricio Lopes – FNAL
Lecture 2: Multipoles, Conformal Mapping,
Pole tip design
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Multipole Magnet Nomenclature
• The dipole has two poles and field index n=1.
• The quadrupole has four poles and field index n=2.
• The sextupole has six poles and field index n=3.
• In general, the N-pole magnet has N poles and field index n=N/2.
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Even Number of Poles
• Rotational periodicity does not allow odd number of poles. Suppose we consider a magnet with an odd number of poles.
• One example is a magnet with three poles spaced at 120 degrees. The first pole is positive, the second is negative, the third is positive and we return to the first pole which would need to be negative to maintain the periodicity but is positive.
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Characterization of Error Fields
• Since satisfies LaPlace’s equation,
must also satisfy LaPlace’s equation.
• Fields of specific magnet types are characterized by the function
where the first term (N) is the “fundamental” and the remainder of the terms (n) represent the “error” fields.
n
n zCF
Nn
n
n
N
N zCzCF
nCzF
4
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1
1
n
n
ndipole zCzCF
2
2
2
n
n
nquadrupole zCzCF
3
3
3
n
n
nsextupole zCzCF
Nn
n
n
N
NNpole zCzCF 2
2
Nn
n
n zCsErrorField
5
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Allowed Multipole Errors
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• The error multipoles can be divided among allowed or systematic and random errors.
• The systematic errors are those inherent in the design and subject to symmetry and polarity constraints.
• Symmetry constraints require the errors to repeat and change polarities at angles spaced at p/N, where N is the index of the fundamental field.
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• In the figure, the poles are not symmetrical about their respective centerlines. This is to illustrate rotational symmetry of the N poles.
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• Requiring the function to repeat and change signs according to the symmetry requirements:
• USing the “polar” form of the function of the complex variable:
p
NpoleNpole FN
F
Nni
NnzC
ezCN
F
n
n
Nin
n
n
p
p
p
p
sincos
ninzCezCzCFn
n
inn
n
n
n sincos
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• In order to have alternating signs for the poles, the following two conditions must be satisfied.
• Rewriting;
p
nN
n coscos
p n
Nn sinsin
p
p
p
p
p
p
nN
nn
N
nn
Nn
nN
nn
N
nn
Nn
sinsincoscossinsin
cossinsincoscoscos
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• Therefore;
integers. odd all , 7, 5, 3, ,1 1cos
integers. all , 4, 3, 2, ,1 0sin
N
n
N
n
N
n
N
n
p
p
• The more restrictive condition is;
integers. all , 4, 3, 2, ,1 ere wh
12integers odd all
m
mN
n
• Rewriting;
integers. all , ,4 ,3 ,2 ,1 where12 mmNnallowed
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Examples
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– For the dipole, N=1, the allowed error
multipoles are n=3, 5, 7, 9, 11, 13, 15, …
– For the quadrupole, N=2, the allowed error multipoles are n=6, 10, 14, 18, 22, …
– For the sextupole, N=3, the allowed error multipoles are n=9, 15, 21, 27, 33, 39, …
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Magnet Field Uniformity
• In general, the two dimensional magnet field quality can be improved by the amount of excess pole beyond the boundary of the good field region.
• The amount of excess pole can be reduced, for the same required field quality, if one optimizes the pole by adding features (bumps) to the edge of the pole.
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• The relation between the field quality and
"pole overhang" are summarized by simple
equations for a window frame dipole magnet
with fields below saturation.
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75.077.2exp100
1
x
B
B
dunoptimize
39.017.7exp100
1
x
B
B
optimized
gap
overhang" pole"
halfh
ax
90.0ln 36.0
B
Bx dunoptimize
25.0ln 14.0
B
Bxoptimized
These expressions are very important since they give general rules for the design of window frame dipole designs. It will be seen later that these expressions can also be applied to quadrupole and gradient magnets.
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• Graphically:
2.52.01.51.00.5
10 -6
10 -5
10 -4
10 -3
10 -2
10 -1
Optimized
Unoptimized
Dipole Field Quality
as a Function of Pole Overhang
x = ah
BB
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Introduction to conformal mapping
• This section introduces conformal mapping.
– Conformal mapping is used to extend the techniques of ensuring dipole field quality to quadrupole field quality.
– Conformal mapping can be used to analyze and/or optimize the quadrupole or sextupole pole contours in by using methods applied to dipole magnets.
• Conformal mapping maps one magnet geometry into another.
• This tool can be used to extend knowledge regarding one magnet geometry into another magnet geometry.
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Mapping a Quadrupole into a Dipole
• The quadrupole pole can be described by a
hyperbola;
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constant a2
C
Vxy
Where V is the scalar potential and C is the coefficient of the function, F, of a complex variable.
The expression for the hyperbola can be rewritten;
2
2hxy
We introduce the complex function;
h
ivx
h
zivuw
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h
yxwu
22
Re
hh
xywv
2Im
h
xyi
h
yxivuw
222
Rewriting;
since
2
2hxy
ihh
yxw
22
Therefore;
the equation of a dipole since the imaginary (vertical) component is a constant, h.
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Mapping a Dipole into a Quadrupole
• In order to map the Dipole into the Quadrupole, we use the polar forms of the functions;
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ieww iezz and
Since was used to convert the quadrupole into the dipole,
iewhhwz 2
h
zw
2
ii
ezewhz 2 whz 2
therefore; and
Finally; 2coscos
whzx
2sinsin
whzy
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Mapping a Dipole into a Sextupole
• In order to map the Dipole into the Sextupole, we use the polar forms of the functions;
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ieww iezz and
Since was used to convert the quadrupole into the dipole,
iewhwhz 223
2
3
h
zw
ii
ezewhz 33 2 3 2 whz 3
therefore; and
Finally; 3coscos 3 2
whzx
3sinsin 3 2
whzy
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Mapping a Dipole into 2N-pole
• General formula to map a Dipole into a 2N-pole
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Nwhx N N
cos1
Nwhy N N
sin1
u
v
vuw
ivuw
arctan
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• u and v are the dipole coordinates
• x and y are the coordinates for the 2N-pole
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Example: Ideal Dipole
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Ideal Dipole mapped in a Quadrupole
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Ideal Dipole mapped in a Sextupole
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Optimized Dipole
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Optimized Dipole mapped in a Quadrupole
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Optimized Dipole mapped in a Sextupole
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The gradient magnet
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xBB
hBxy
o
o
')(
'B
BxX o
XB
hB
B
BXBB
hBXy o
oo
o
'
''
)(
'2
2
B
hBHXY o
'
22
B
hBH o
H
XYi
H
YX
H
iYX
H
Zivuw
2222
H
YXu
2
H
XYv
2
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Gradient into a Dipole Magnet
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'
2
'
2
2
B
hB
yB
Bx
uo
o
'
22
B
hBH
H
XYv o
Dipole into a Gradient Magnet
uwH
B
BxX o
2' uw
HyY
2
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Gradient into a Dipole Magnet
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Dipole into a Gradient Magnet (not optimized)
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Dipole into a Gradient Magnet (optimized)
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The Septum Quadrupole
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• In order to maximize the number of collisions and interactions in a collider, the two beams must be tightly focused as close to the interaction region as possible. At these close locations where the final focus quadrupoles are located, the two crossing beams are very close to each other. Therefore, for the septum quadrupoles, it is not possible to take advantage of the potential field quality improvements provided by a generous pole overhang. It is necessary to design a quadrupole by using knowledge acquired about the performance of a good field quality dipole. This dipole is the window frame magnet.
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• The conformal map of the window frame dipole aperture and the centers of the separate conductors is illustrated.
• The conductor shape does not have to be mapped since the current acts as a point source at the conductor center.
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Quadrupole Field Quality
• The figure shows the pole contour of a quadrupole and its required good field region.
The pole cutoff, the point at which the
unoptimized or optimized quadrupole
hyperbolic pole is truncated, also
determines the potential field quality for
the two dimensional unsaturated
quadrupole magnet.
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• The location of this pole cutoff has design implications.
It affects the saturation characteristics of the magnet
since the iron at the edge of the quadrupole pole is the
first part of the pole area to exhibit saturation effects as
magnet excitation is increased. Also, it determines the
width of the gap between adjacent poles and thus the
width of the coil that can be installed (for a two piece
quadrupole). The field quality advantages of a two
piece quadrupole over a four piece quadrupole will be
discussed in a later section.
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• Given; (uc, vc) satisfying dipole uniformity requirements.
• Find; (xc, yc) satisfying the same requirements for quadrupoles.
h
rr
h
zw regionfieldgood
2
0
2
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factor 90.0ln 36.0 dunoptimizehB
Bha dunoptimize
factor 25.0ln 14.0 optimizedhB
Bhaoptimized
h= and 2
0
2
0cc vfactorh
h
ra
h
ru
For the Dipole;
Therefore;
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ihh
yxivuw
22
h
rr
h
zw regionfieldgood
2
0
2
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h
r00 Substituting a unitless (normalized) good field region,
2sinsin
2coscos
whzy
whzx
and using the conformal mapping expressions,
2
cos1
2sin
2
cos1
2cos
and the half angle formula,
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factorfactorh
y
factorfactorh
x
c
c
2
0
22
0
2
0
22
0
2
11
2
1
2
11
2
1
we get,
12
1
24
1
2222
2
2
2
0
22
2
2
0
2222
factorh
r
h
hfactor
h
r
h
v
h
u
h
vu
h
wccccc
and substituting,
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90.0ln 36.02
1190.0ln 36.0
2
1
90.0ln 36.02
1190.0ln 36.0
2
1
2
0
2
2
0
dunoptimize
2
0
2
2
0
dunoptimize
B
B
B
B
h
y
B
B
B
B
h
x
c
c
25.0ln 14.02
1125.0ln 14.0
2
1
25.0ln 14.02
1125.0ln 14.0
2
1
2
0
2
2
0
optimized
2
0
2
2
0
optimized
B
B
B
B
h
y
B
B
B
B
h
x
c
c
Substituting the appropriate factors for the unoptimized and optimized dipole cases, we get finally for the quadrupoles;
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• The equations are graphed in a variety of formats
to summarize the information available in the
expressions. The expressions are graphed for both
the optimized and unoptimized pole to illustrate
the advantages of pole edge shaping in order to
enhance the field. The quality at various good
field radii are computed since the beam typically
occupies only a fraction of the aperture due to
restrictions of the beam pipe.
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2.01.51.01.0
10 -6
10 -5
10 -4
10 -3
10 -2
Quadrupole Field Quality
as a Function of Pole Cutoff
BB
xc
h
Optimized pole
Unoptimized pole
0 = 0.9
0 = 0.9
0 = 0.8
0 = 0.8
0 = 0.7
0 = 0.7
0 = 0.6
0 = 0.6
43
h
r00
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10 -210 -310 -410 -510 -60.2
0.3
0.4
0.5
Quadrupole Half Throat Height
BB
yc
h
0 = 0.9
0 = 0.9
0 = 0.8
0 = 0.8
0 = 0.7
0 = 0.7
0 = 0.6
0 = 0.6
Unop
tim
ized
Optim
ized
44
h
r00
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10 -210 -310 -410 -510 -61.0
1.2
1.4
1.6
1.8
2.0
2.2
2.4
Ratio of Peak Field to Poletip Field
BB
Bcutoff
Bpole
0 = 0.9
0 = 0.9
0 = 0.8
0 = 0.8
0 = 0.7
0 = 0.7
0 = 0.6
0 = 0.6 Unoptimized
Optimized
45
h
r00
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Typically, 1max h
z
1
2
quadrupole
h
z
h
w
dipole
1
3
sextupole
h
z
h
w
dipole
and
Therefore,
in the mapped space.
However, there is a problem in the mapping of the quadrupole and sextupole to the dipole space.
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• When mapping from the quadrupole or sextupole geometries to the dipole space, the FEM computation is initially made in the original geometry and a vector potential map is obtained at some reference radius which includes the pole contour.
47
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The vector potential values are then mapped into the dipole (w) space and used as boundary values for the problem.
,, refref rawA
quadrupole
ref
refh
rw
2
sextupole
ref
refh
rw
2
3
quadrupole 2
sextupole 3
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General guidelines for Quadrupole/Sextupole Pole Optimization
49
• It is far easier to visualize the required shape of pole edge bumps on a dipole rather than the bumps on a quadrupole or sextupole pole.
• It is also easier to evaluate the uniformity of a constant field for a dipole rather than the uniformity of the linear or quadratic field distribution for a quadrupole or sextupole.
• Therefore, the pole contour is optimized in the dipole space and mapped back into the quadrupole or sextupole space.
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• The process of pole optimization is similar to that of analysis in the dipole space.
– Choose a quadrupole pole width which will provide the required field uniformity at the required pole radius.
• The pole cutoff for the quadrupole can be obtained from the graphs developed earlier using the dipole pole arguments.
• The sextupole cutoff can be computed by conformal mapping the pole overhang from the dipole space using
cc yx ,
3 2whz
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• Select the theoretical ideal pole contour.
2
2hxy
3323 hyyx
for the quadrupole.
for the sextupole.
• Select a practical coil geometry.
– Expressions for the required excitation and practical current densities will be developed in a later lecture.
• Select a yoke geometry that will not saturate.
• Run a FEM code in the quadrupole or sextupole space.
• From the solution, edit the vector potential values at a fixed reference radius.
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• Map the vector potentials, the good field region and the pole contour.
• Design the pole bump such that the field in the mapped good field region satisfies the required uniformity.
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• Map the optimized dipole pole contour back into the quadrupole (or sextupole) space.
• Reanalyze using the FEM code.
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Closure
54
• The function, zn, is important since it represents different field shapes. Moreover, by simple mathematics, this function can be manipulated by taking a root or by taking it to a higher power. The mathematics of manipulation allows for the mapping of one magnet type to another, extending the knowledge of one magnet type to another magnet type.
• One can make a significant design effort optimizing one simple magnet type (the dipole) to the optimization of a much more difficult magnet type (the quadrupole and sextupole).
• The tools available in FEM codes can be exploited to verify that the performance of the simple dipole can be reproduced in a higher order field.
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Next…
55
• Perturbations
• Magnet excitation