the investigation of thermal and non- thermal noises in fused silica fibers for advanced ligo...
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The investigation of thermal and non-
thermal noises in fused silica fibers for
Advanced LIGO suspension
Moscow State University
Bilenko I.A.
Lyaskovskaya N. Yu.
G050086-00-R
0
1~H
Q, 8
0 10silica bestQ (P.Willems V.Mitrofanov, et.all 2002)
Advanced LIGO limitation factors: mechanical noises in the mirror suspension
system
• Equilibrium thermal noise – can be obtained by Fluctuation-Dissipation theorem:
2
2 22*2 2 2 0
0 2
4x
kTHS
mQ
• Results achieved on the fused silica fibers suspension is
promising:
Excess mechanical noise is possible!
• Has been observed on the bar gravitational wave antennae
• Has been measured in stressed inhomogeneous solids (Dykhne et. all Physica A241 94 1997 )
• Investigated experimentally in LIGO team (P.Saulson A.M.Gretarsson, in press}.
• Observed by MSU group in the LIGO suspension models (tungsten and steel wires)
Stationary and non-stationary fluctuations can exists.
M
X
x
2110violin fiberkT elasticE E
Noise in the suspension wire (fiber)
- if there is some mechanism of the “energy diffusion” from the elastic (static) form to the oscillatory (kinetic), then the noise of non-thermal origin may appear.
M
X
x
m*
m M
x X
- Let us to monitor oscillation the wire (fiber) instead of the test mass
motion(Braginsky 1994)
- It is interesting to observe amplitude variations during
t
Noise in the suspension wire (fiber) – method of measurement
Excess noise in the steel wires Has been detected in the samples from the material used in Initial LIGO under high stress:
5 :i iA A 1 – 20 events/10 hours observed on some samples under stress >50% of breaking value
* 2 *
2 2i
kT tA
m
* 10 s
0.2t s
Relaxation time:
11min 2 10 /x cm Hz
Sensor: He-Ne laser based Micelson interferometer
corresponds:min 0.1E kT
40 3 10steelQ
Best sensitivity achieved:
(Ageev, Bilenko, Braginsky 1998)
Fundamental violin mode amplitude variation over the time
Goals:
0 0silica steelQ Q
min 1310 /xS cm Hz
Excess noise in the fused silica fibers
• Keep high quality factor of the fiber:
- reduce recoil losses
- minimize fiber contamination
• Measure the amplitude variations over the time short as compared to ringdown time. Desired sensitivity:
• Check for non-Gaussian distribution of the amplitude variations
• Single pass He-Ne based optic :
~ x
1 13 135 10 / 10 /2
HeNe passxS cm Hz cm Hz
W
Measurement of the noise in the fused silica fibers – approaches tested and denied:
• Optical microcavities (“twin balls”)
based sensor -
electrostatic sealing is inevitable
• Fabry-Perot with intermediate sphere
(semi-transparent mirror) -
mode matching is hard-hitting
Fabry-Perot with a mirror welded into the sample
50...100F • Finesse:
min
15
2
3 10 /
xSF W
cm Hz
• Maximum sensitivity:
• Quality factor achieved:
5 710 ...10Q
Silica fiber with support and mirror
2 mm
Oscillation modes tested
Violin-like mode:
5 6
400 760
1 10 3 10
f Hz
Q
Mirror-swinging mode:
6 7
1 2
5 10 2 10
f kHz
Q
Installation diagram
SR765 SR765 He-Ne 2mW
EOM
4 56 7 8 9
914
Seismic shadow sensor
8
PZT drive
АМ noise“eater”
Makeweight manipulator Fabry-Perot mirrors
Fiber with welded mirror
2 x SR810amplifiers
SR765analyzer
Installation picture
Typical mirror oscillations spectrum (analyzer binwidth 4 Hz).
Violin-like mode
Mirror-swinging mode
Measurements results
• Best obtained sensitivity:min 149 10 /xS cm Hz 2f kHz
• Sensitivity in the violin-like mode domain: 500 1210 /Hz
xS cm Hz
corresponds to:min 0.01E kT
* 600 s
0.1t s
60 10silicaQ
• Relaxation time
for violin-like mode:
Minimum amplitude variations measured over
Sample management
2. Installation, optic adjustment, pumping out the tank
1. Fabrication (welding)
3. Data recording (night time, record length 1-5 h, up to 10 records/sample)
4. Applying the makeweight (for some samples), more data recording
5. Sample tensile testing
Record example
Data processing procedure
Obtained: 90 hours of “clear” records for 9 samples from 50 to 180 m in diameter stressed from ~4% to ~50% from breaking value.
2. Filtering and digitizing with sample rate 100 1/s, averaging with t = 0.1 s
1. Obtaining signals proportional to the amplitudes of selected modes.
3. Applying the “veto” using the local seismometer information
4. Estimation of the average amplitude variation over 0.1 s, plotting a distribution
5. Selection of the “candidate evens”, test for coincidence with control channels, replotting distribution
Amplitude variations distribution
1t i iA A A 2
2
1exp
22t
t
AP A
2tA
0 45986N
/10x
Record on sample Q21:
Alternative representation – Energy innovation histogram
2 221 11 1 2 2i i i i iA A A A
A1,A2 record made on sample Q21 for comparision porpose
pair of quadrature amplitude have to be recorded:
Results summary
Conclusions Affordable installation for investigation of mechanical noise
in fused silica fiber has been designed. Best displacement sensitivity is: min 149 10 /xS cm Hz
Non-Gaussian (excess) mechanical noise hasn’t been observed at the achieved sensitivity level.
Extrapolation of this result to the Advanced LIGO suspension shows promise that this type of noise will not affect the detector sensitivity at the level:
17*
21 10m
gr LL
t mx A A cm
M
In order to investigate the noise in the suspension with better resolution both, the quality factor of violin-like mode and the sensitivity of the readout system should be improved
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