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1.2 Fundamental equations for rf test
3
determined. These tests are done inside the cryostat where the cavity is held vertically.
Ideally, these tests are done at or near critical coupling. In addition to improving the systematic errors, setting the fundamental power coupler at or near critical coupling reduces
the rf power requirement to a value close to that required for cavity wall losses.
The critical variable for calculating the rf parameters of a superconducting cavity is
the shunt impedance, which relates the stored energy to the effective accelerating gradient.
It, along with cavity geometry, is the parameter necessary for calculating peak electric
field, and peak magnetic field for any given mode. In our case it is determined using the
electromagnetic simulation tool called Superfish and all important parameters determined
for 1.5 and 1.3 GHz cavities are collected in tables 1.1 and 1.2 .
Symbol
Variable name
Units
r/q
Geometric shunt impedance
Ω/m
G
Geometry factor
Ω
E
Electric field
V/m
L
Electrical lenght
m
ω0
cavity frequency
s−1
U
Stored energy name
J
Rs
Surface resistance
Ω
Tc
Critical temperature
K
Pemit
Emitted power
W
R
Shunt impedance
Ω
T
Operational temperature
K
Rres
Residual surface resistance
Ω
Q0
Intrinsic quality factor
Qcpl
Fundamental Power coupler coupling factor
Qpk
Field probe coupling factor
RC
Coupling impedance
Ω/m
Pdiss
Dissipated power
W
τ
Decay time
s
r
Shunt impedance per unit length
Ω/m
Table 1.1: Common variables when discussing rf cavities [4].
When a cavity mode oscillates with a resonant frequency ω0 , a stored energy U and rf
losses on the cavity walls, Pd , the quality factor can be defined as:
Q0 =
ω0 U
Pd
(1.10)
Q0 is 2π times the ratio of the stored energy and the energy consumed in one period.
In the frequency domain the Q0 can also be expressed as