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Sidereal anisotropy of GCR intensityLatest results of two hemisphere observations
by Tibet & Ice CubeK. Munakata (Shinshu Univ., Japan)
ICRR seminar, June 25 ,2010
• Latest results by Tibet & Ice Cube (Introduction)North vs. South, Air shower vs. Muon, Energydefference....
• UG muon observations (SK, THN)North-south asymmetry, Solar modulation in sub-TeV region.
• Observation & analysis method of the anisotropy• Air shower observations with Tibet AS array
C-G effect in the solar time, Sidereal anisotropy,best-fit model (GA+MA model).
• Discussions
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Two-hemisphere observations byTibet & Ice Cube
intensity significance
• AS measurement (p+γ)• Emode = 7 TeV (calibrated by using Moon shadow)
• 4.5x1010 events in 1999.11-2008.12(270 Hz)
Ice Cube(Abbasi et al., arXiv:1005.2960v1, 2010)
Tibet ASγ(Amenomori et al., Science, 314, 2006)
• muon measurement (p)• Emode = 20 TeV• 4.3x109 events in 2007.6-2008.3
(220 Hz)
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• Ground-based detectors measure byproducts of the interaction of primary cosmic rays (mostly protons) with Earth’s atmosphere.
• AS array measures electromagnetic component in the cascade shower.
• AS array also responds to primary γ-rays, while the muon detector responds only to primary protons & nuclei.
Cosmic ray observation withAS array & muon detector
Neutron monitor
Muondetector
Air shower array
primary γ
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● The celestial coordinate with declination (δ) and right ascension (R.A. or α).
δ=30o
● The latitude of Yangbajing in Tibet is 30oN.
δ=90o
The zenith direction there corresponds to δ=30o.
δ=30o
With the rotation of the Earth, the zenith direction travels the δ=30o line.
● Fixed direction in the horizontal coordinate travels d=constant line.It returns to the same right ascension after 1 sidereal day (360o rotation).
δ=90o
Analysis method (1)
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● Possible other time variations are:- Time variation due to the atmospheric effect.- Time variation due to the solar modulation effect.- An interference between one-day and one-year period variations
● CR flux from each celestial position is compared with average of the same declinations.
produces fake one sidereal-day period variation.⇒ examine anti-sidereal anisotropy
● 360o of right ascension is scanned in one sidereal day. Time variation analysis of one sidereal day period is essential.
These background time variations are carefully evaluated and removed to extract primary CR anisotropy of 0.1% level.
Analysis method (2)
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(Guillian et al., PRD., 75, 2007)Observation with the Super Kamiokande
• 2.1×108 muons in 1996.1-2001.5(1.8 Hz)
• Em=10 TeV
• Downward going muons(zenith angle = 0°~90°)
Intensity map (normalized) Significance map
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Matsushiro (MAT)
Liapootah (LPT)
1985~present
1993~2005
Two Hemisphere Network (THN)
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RA (º)
dec
(º)
Direction of motion of the heliosphere relative to LISM
by Tibet III (5°x5° pixel)
Sky maps by Tibet & THNAmenomori et al., Science, 314, 2006
dec
(º)
by THN(white countour) Hall et al., JGR, 104, 1998
equatorial plane
equatorial plane
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Two Hemisphere Network (THN)
Hall et al. (JGR, 1998,1999) analyzed initial 4 years data of THN First 2D sky-map by “Gaussian analysis”
In this paper, we use the THN data updated to…• Apply a best-fitting analysis identical to that adopted by
Amenomori et al. (2007) for Tibet III data.
• Derive energy dependence of the best-fit anisotropy by comparingthe best-fit parameters from the THN observation in the sub-TeVregion and Tibet III experiment in the multi-TeV region.
Matsushiro (MAT) Liapootah (LPT)
location 36°32′N 130°01′E 42°20′S 146°28′E
V depth (m.w.e.) 220 154
count rate (Hz) 5.4 7.0
V median primary P (TV) 0.659 0.519
no. of viewing directions 17 17
Analyzed period 22 years(1985-2006)
13 years(1993-2005)
Amenomori et al., arXiv0811.0422, 2008
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Bi-Directional Flow(BDF)
Uni-Directional Flow(UDF)
a1//
a1⊥
ϕ (α1, δ1)
a2//
α2
δ2
Reference axis(eg. Magnetic field line)
Global Anisotropy model
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:136 independent data
Sidereal daily variations
-0.1
0
0.1
0 6 12 18 24
(%)
MAT "V"(34.5oN)
local sidereal time (hours)
-0.1
0
0.1
0 6 12 18 24
(%)
LPT "V"(36.2oS)
local sidereal time (hours)
amplitude
phase
00:00
06:00(03:00)
12:00(06:00)
18:00(09:00)
harmonic dial for m=1 (m=2)
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0
0.02
0.04
0.06
0 0.02 0.04 0.06
V
SE
N
W
00:00
06:00
(%)
(%)
(a)
0
0.02
0.04
0.06
0 0.02 0.04 0.06
V
N
SE
W
00:00
06:00
(%)
(%)
(b)
-0.04
-0.02
0
0.02
-0.04 -0.02 0 0.02
V
N
S
E
W
00:00
03:00
06:00
(%)
(%)
(c)
-0.04
-0.02
0
0.02
-0.04 -0.02 0 0.02 (%)
V
N
S
E
W
(%)00:00
03:0009:00
(d)
Summation dialsLPT (1993-2005)MAT (1985-2006)
m=1
m=2
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N
S
-0.05
0
0.05
0 6 12 18 24
(%)
MAT "N"(57.0oN)
-0.05
0
0.05
0 6 12 18 24
(%)
LPT "N2"(4.4oN)
-0.05
0
0.05
0 6 12 18 24
(%)
MAT "V"(34.5oN)
-0.05
0
0.05
0 6 12 18 24
(%)
LPT "N"(14.7oS)
-0.05
0
0.05
0 6 12 18 24
(%)
MAT "S"(11.2oN)
-0.05
0
0.05
0 6 12 18 24
(%)
LPT "V"(36.2oS)
-0.05
0
0.05
0 6 12 18 24
(%)
local sidereal time (hours)
MAT "S2"(8.2oS)
-0.05
0
0.05
0 6 12 18 24
(%)
local sidereal time (hours)
LPT "S"(57.6oS)
Sidereal daily variations by THN
RA distributionby Tibet III
-0.3
0
0.3
0 90 180 270 360
7.5S7.5N22.5N37.5N52.5N
(%)
right ascension (degree)
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Tibet (5 TeV)
±0.2
0 %
THN (0.5 TeV)
±0.0
7 %
• Best-fit models of GA are very similar to each other, except 1/3 amp. by THN.• This implies that the modeling with Tibet data in a single hemisphere is not
seriously biased.
a2// (%) α2// (°) δ2// (°)0.020±0.001
(0.095±0.001)96.4±2.5
(97.4±2.5)-17.1±2.5
(-22.5±2.5)
Best-fitting to THN & Tibet
a1// (%) a1⊥ (%) α1⊥ (°) δ1⊥ (°)0.016±0.001
(0.096±0.001)0.020±0.001
(0.108±0.001)182.5±2.5
(177.5±2.5)12.5±2.5
(22.5±2.5)
χ2/d.o.f. =1.72(χ2/d.o.f. =2.44)
Model anisotropy
Best-fit parameters
(Amenomori et al., arXiv0811.0422, 2008)
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Energy dependence of amplitudein space
0.0001
0.001
0.01
0.1 1 10 100
Uni.(UG muon)Uni.(Tibet AS)
Bi.(UG muon)Bi.(TibetAS)
ampl
itude
E (TeV)
Hall et al., JGR, 103, 1998 &104, 1999
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The Heliosphere
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(SO: 365 c/y)
Sept.
Dec.
Mar.
Jun.
12
9
6
3
0
21
18
15
Cosmic-Ray Flow
0.01
0.1
1
0.01 0.1 1 10 100
solar(muon)solar(TibetIII)
sidereal(muon)sidereal(TibetIII)
am
plit
ude (
%)
E (TeV)
Compton-Getting効果
MAT~0.6 TeV
SO SI
Solar modulation of solar and sidereal diurnal anisotropy
(SI: 366 c/y)
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同時刻集計 in 太陽時(SO)・恒星時(SI)名古屋V (60 GV) 三郷V (145 GV)
坂下V (331 GV) 松代V (659 GV)[%]
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W. I. Axford(Planetary and Space Sci., 13, 1965)
SOSI
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Solar cycle dependence of0.6 TeV GCR anisotropy
(by Matsushiro UG-µ detector in 1985-2008)
CG effect(solar min.) quiet
active
Compton-Getting
Solar daily variation
SI(366 c/y)
SO(365 c/y)
AS(364 c/y
Munakata et al., ApJ, 712, 2010
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Solaractivity
SO
SI
~15:00 LT
γmax=+0.74∆tCR=+26 months
(400 km/s solar wind travels ~180 AU)
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SO
SI
γmax=+0.57∆tCR=+14 months
~03:00 LT
Solaractivity
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SI daily variation
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(Abdo et al., 2009)
(×3)
Steady increase of amplitude?No significant correlation with the solar activity
seen by Matsushiro
SI
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0
0.05
0.1
1985 1990 1995 2000 2005 2010
Matsushiro UG-µTibet AS
amplitude (%)
year
~1/3 attenuation by the solar modulation
only ~1/6 amplitude changing with the solar cycle
Small solar cycle variation (if any)
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By
MHD model heliosphere
100200
300 AU
z
xNPNP
Positive Negative
Washimi et al., ApJL, 670, 2007
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Tibet III AS Array
• 37000 m2 detection area• Total 789 detectors• Mode Energy ~ 3 TeV• Trigger Rate ~ 1.7 kHz
Google map
@Yangbajing (八羊井)Tibet, China
90°53′ E, 30°11′ N4,300 m a.s.l. (606 g/cm2)
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E-W Method (method I)K.Nagashima et al., Nuovo Cimento Soc. Ital Fis. 12C, 695(1989)
The time derivative of R(t) can be obtained• Can correct common variations
including the atmospheric effect.• Sacrifices statistical significance.
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Zenith
On -source
Off -sourceOff -source
Ion, Non on
on
NI
off
off
N
I
Equal
Ioff, Noff
I(i,j) : Relative Intensity
In the m-time slot
(ROOT MINUIT http://seal.web.cern.ch/seal/snapshot/work-packages/mathlibs/minuit/)
Obtain I(i,j) giving minimum χ2
M. Amenomori, et al., ApJ. 633, 1005 (2005)
Equi-Zenith Angle Method (method II)
+3%
−3%Azimuth anisotropy
Normalize the average of I(i, j) in eachdeclination band to 1
m : time (5°=20minutes)n : zenith angle (4°)l : azimuth angle (4°/sin(n))
i : right ascension (5°)j : declination (5°)
Obtain 2D map of I(i, j)
Gives R(t) itself in stead of time derivative• No sacrifice of statistical significance.• Azimuth anisotropy must be corrected
in advance.
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Compton-Getting effect (in solar time)
Method I Method II
SI2 variation (367 c/y) as a measure of systematic error
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Intensity map (normalized)
Observed sidereal anisotropy(1,916 live days in Nov. 1999 ~ Dec. 2008)
right ascension (º)
decl
inat
ion
(º)
decl
inat
ion
(º)
Emode = 7 TeV
(5°x5° pixel) Heliotail
Lallement’s HDPGarnett’s HDP
Significance map
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6 h
12 h
18 h
0 h
3 h9 h
SiderealDiurnal
SiderealSemi-diurnal
Mt. Norikura (1973-87)
0 hP1: Nov.99~Jun.00P2: Oct.00~Jan.01P3: Dec.01~Sep.02P4: Nov.02~Mar.03P5: Dec.03~Oct.04P6: Oct.04~Nov.05P7: Dec.05~Nov.06P8: Nov.06~Feb.08P9: Mar.08~Dec.08
3 h9 h
0 h
18 h 6 h
Tibet ASγ (1999-2008)
Global Anisotropy model (1/3)
Bi-Directional Flow(BDF)
Uni-Directional Flow(UDF)
a1//
a1⊥
ϕ (α1, δ1)
a2//
α2
δ2
Reference axis(eg. Magnetic field line)
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Best-fit parameters(Amenomori et al., proc. ICRC, 2009)
Uni-directional Bi-directionala1⊥ =0.141%, a1// =0.008% a2// =0.140%α1⊥ =37.5°, δ1⊥ =37.5° α2// =97.4°, δ2// =-22.5° (LIMF orientation)
For 5 TeV CRs… Larmor radius : RL~ 0.002 pc in 3µG fieldScattering m.f.p. : λ// ~ 3 pc
(e.g. Moskalenko et al., 2002)
Bohm factor λ// /RL~ 1500 >> 1 (~10 in the heliosphere)⇒ Perp. diffusion flux is negligible
⇒ Only diamagnetic drift can produce significant a1⊥
a1// ∼ λ// /L∼0.001 ∴L ~ 3 kpcLarge-scale?However…
a1// is not significant, but a1⊥
a1⊥∼ RL/L’ ∼0.001 ∴L’ ~ 2 pcLocal-scale structure is needed
Global Anisotropy model (2/3)Origin of Uni- & Bi-directional flows
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Global Anisotropy model (3/3)
This model also allows us to inferthe polarity of B from ∇n
29 km/s
G cloud
Interstellar B
∇nUni-directional flow(Bx∇n)
High n
26 km/s
Low n~5 pc
Bi-directional flow(parallel diffusion)
LICLow nSun
26 km/sHeliosphere
~ 3 pc
Local Interstellar Cloud
Redfield & Linsky, ApJ, 534, 2000
Slavin, AIP proc., 1156, 2009
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Midscale Anisotropy model (1/2)
Obs.
GABest-fitting
MAObs.- GA
(significance)
Lallement’s HDPGarnett’s HDP
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The heliosphere as seen outside the solar system:
Asymmetric! (Opher, 2007)
100 AU
Linde (1998)
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Miraglo “hot” regions A & B(Abdo et al., PRL, 101, 2008)
χ2/d.o.f. = 2.69 χ2/d.o.f. = 1.97
BA
Φ
Midscale Anisotropy model (2/2)
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Original intensity Normalized intensity
UDF
BDF
MA
+
+
=
Best-fitmodel
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a2// (%) α2// (°) δ2// (°)
0.134±0.002(0.133±0.002)
99.7±0.6(98.0±0.4)
-27.3±1.4(-17.5±0.8)
b1 (%) b2 (%) σ// (°) σ⊥ (°) Φ (°)
0.150±0.013 0.095±0.004 23.8±0.7 11.0±0.5 49.5±0.9
Best-fit parametersGA+MA model (with GA alone)
a1// (%) a1⊥ (%) α1⊥ (°) δ1⊥ (°)
0.005±0.002(0.026±0.001)
0.145±0.002(0.151±0.001)
34.8±0.8(27.5±0.8)
39.5±0.8(46.7±0.5)
χ2/d.o.f. =1.97(χ2/d.o.f. =2.69)
GA
MA
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Energy dependence (1/3)(The energy resolution is ~50 %)
4.0(TeV)
4.6
5.7
7.8
11.0
29.0
EmodeObs. MAGA
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Energy dependence (2/3)
MA
GA
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Energy dependence (3/3)
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Milagro hot region A(Abdo et al., PRL, 101, 2008)
Tibet : +14σ (α=67.5±2.5°, δ=17.5 ±2.5°)Milagro: +15σ (α=69.4±0.7°, δ=13.8 ±0.7°)
• 2.6° wide and 7.6° long, 46° inclined from RA axis.• Inconsistent with γ-ray emission (AS compactness).• Appears like the well-collimated hadron beam.
• Difficult to interpret in terms of the proton’s propagation in LISMF• Neutron production in the gravitationally focused tail of ISM material?
Neutron decay length is cγτ ∼ 0.1 pc >> RL, but the low column density of ISM can produce only an intensity excess of 10-10 rather than 10-3.
intensity
significance
(Drury & Aharonian, arXiv:0802.4403, 2008)
10-3 excess
Crab
This also applies to a possible idea interpreting ~10-3 GA in terms of the hadronic interactions of CRs with ISM matter.
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Deriving original anisotropywithout normalization in each declination band
• In the present map, the average intensity in each declination is normalized to unity.
• For deriving original anisotropy, the azimuth distribution must be corrected for all systematic effects at ~10-3 accuracy.
• Tibet AS-array normal is inclined for 1.3°toward south-west direction, causing a 10-2
systematic effect.• Correction seems to be still possible.
+
+
=
Normalized intensityOriginal intensity
UDF
BDF
MA
Best-fitmodel
Equi-Zenith Angle Method
Zenith
On-source
-Off-source Off-source
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Two-hemisphere observationsTibet (7 TeV) THN (0.5 TeV)
±0.2
0 %
±0.0
7 %
• Best-fit models of GA are very similar to each other, except 1/3 amp. by THN.
Tibet (7 TeV)Ice Cube (20 TeV)
Data
GA+MA modelfor Tibet
Tibet (29 TeV)Ice Cube (20 TeV)
• Need more statistics for quantitative comparison between Tibet & Ice Cube.
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0.9992
1
1.0008
0 90 180 270 360
Ice CubeTibet srogt100
RA
0.9992
1
1.0008
0 90 180 270 360
Tibet srogt10GA+MA model srogt10
RA
0.9992
1
1.0008
0 90 180 270 360
Tibet srogt100GA+MA model srogt100
RA
0.9992
1
1.0008
0 90 180 270 360
IceCubeGA+MA model srogt100
RA
20 TeV
29 TeV
7 TeV
29 TeV
20 TeV
29 TeV
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Summary Sidereal anisotropy by Tibet AS and UG-muon observations (SK & THN) are
consistent with each other, implying minor contribution from γ-rays to the global anisotropy.
Sidereal anisotropy by Tibet AS and THN are consistent with each other, implying the modeling with Tibet data in a single hemisphere is not seriously biased.
THN observed a time-dependent attenuation (~1/3) of amplitude due to the solar modulation, while the anisotropy by Tibet is fairly constant.
Sidereal anisotropy by Tibet AS is well modeled in terms of GA and MA, representing modulations in the LISMF and in the heliotail, respectively.
The contribution from γ-rays to the anisotropy by Tibet should be identified and discriminated, quantitatively, e.g. Milagro’s hot region A ⇒ Tibet MD project.
For better understanding the origin of the anisotropy, the present analysis method must be improved to derive the “original” anisotropy without the normalization in each declination band.
Two hemisphere observations by Tibet and Ice Cube should be encouraged.