structure function measurement of 40ar via (e,e’p)...
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S P E C T R A L F U N C T I O N I N N E U T R I N O G E N E R AT O R S : S T R U C T U R E F U N C T I O N M E A S U R E M E N T o f 4 0A r
v i a ( E , E ’ p ) a n d I T S I M PA C T O N N E U T R I N O O S C I L L AT I N G PA R A M E T E R S
C h u n - M i n ( M i n d y ) J e n ( C e n t e r f o r N e u t r i n o P h y s i c s , V i rg i n i a Te c h . )
N u I N T 1 4 ’ M a y 2 0 t h , 2 0 1 4
�1
Introduction to Structure (Spectral) Functions
The Role of Spectral Function in Lepton-Nucleus Cross Section Cal.
Electron Cross-section Validation (12C and 40Ca)
Neutrino Cross-section Comparison (GENIE, GiBUU, NuWro)
Impact on Oscillation Parameters
Conclusions
Outline
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech2
THROUGH ELECTRON SCATTERING, STRUCTURE FUNCTION IS EXTRACTED
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�3
k [GeV/c]0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8
]-3
n(k)
[GeV
210
310
410
510
610
momentum distribution
n(k)
[GeV
-3]
k F~ 2 2 5 M e V / cE B~ 2 5 M e V
SF
RFGM
• initial-state nucleon’s momentum distribution, kn, is assumed to be flat (no structure) for all shells below the Fermi sea (kF)
• the spectral function theory considers the difference in the structure function for each shell and thus is capable of yielding a much better prediction while being compared to the measured electron cross-section than RFGM
DWIA
SEPARATION ENERGY OF EACH NUCLEON WITH ONE SPECIFIC
QUANTUM NUMBER IS INDIVIDUAL
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�4
correlation
E [G
eV]
✤ absence of position correlation in the ground state wave function between each pair of nucleons
✤ the energy distribution of each shell is a delta function (discontinuous)
✤ all nucleons feel the same force acting on them as a result of a mean field potential
✤ N-N (position) correlations are formed by the charge density distribution
✤ N-N (position) correlations cause the overlap of energy distributions (continuous)
✤ N-N (position) correlations lead to the strong short-range repulsion (back-to-back)
✤ N-N (position) correlations affect the momentum distribution of each shell
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�5
• RFG model
step function (no structure) energy-momentum conservation
• SF model (1p-1h : the simplest case)
probability amplitude of knocking out one nucleon energy-momentum conservation
Math Form of Spectral Functions telling you the “probability” of knocking out one nucleon
with one specific quantum number
SPECTRAL FUNCTION IN CROSS-SECTION CALCULATION
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�6
in RFGM, nucleons sitting near the Fermi sea are most likely to interact with beam particles
!the spectral function theory, however, demonstrates the non-zero probability of interacting with nucleons with translational momentum above the Fermi sea as a result of N-N interactions
> kF, cross-section is non-zero
k [GeV]
integrating over the entire phase space —> dp3 = p2dp
probability of interacting with one nucleon with a quantum number
A more realistic initial-state nuclear shell model for 40Ar is needed
what is the spectroscopic factor for 40Ar?
what is the separation energy of proton and neutron with the specific quantum number on each shell?
what is the energy-dependence of each shell’s momentum?
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�7
RFGM vs. SF (how different?)
the energy transfer or Q2 on the interaction vertex of neutrino-
nucleus
the probability of knocking out one nucleon with one specific quantum number determines the size of neutrino-nucleus cross-section
non negligible effect on the determination of the neutrino energy either for just CCQE or CC-all
oscillation parameters determination are affected by neutrino energy reconstruction uncertainties
fundamental constants like Ma affected by nuclear model - new nuclear model validation
why nuclear physicist cares? why neutrino physicist cares?
far beyond nuclear physicsbeam energy/flux are un-determined Q2 at the interaction vertex is not constrained no way to detect final-state neutrinos hard to do final-state energy reconstruction
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�8
structure functions for 12C, 16O, 40Ca and 40Ar (not well-determined yet) are “temporarily” implemented in GENIE at present. all modifications which we made in our studies and generated results from GENIE are identified as GENIE v2.8.0+ “nuVT”
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�9
Final-State-Interactions (FSI)energy-momentum conservation of final-state particles
an optical model used to describe FSI corporates within the spectral function approach
�10Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech
Electron Validation 12C and 40Ca
The FSI effects can be consistently described within the spectral function approach. Please see Artur Ankowski’s presentation.
�11Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech
Owing to the lack of electron scattering data, the energy-momentum dependence in structure functions of argon is not strongly constrained
40Ar - a very crude and preliminary structure functions
JLab Hall-A PAC 41 (Jul. 2014) electron scattering experiment on 40ArUVa / VT / Syracuse / LANL / INFN-Rome / JLab (Hall-A)
Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
Neutrino Cross-Section RFGM vs. SF
GENIE / Omar Benhar’s cal.
�12
]2 [GeV2Q0 0.2 0.4 0.6 0.8 1 1.2 1.4 1.6 1.8 2
/sr G
eV]
2cm
-38
[10
2/d
Qmd
0
2
4
6
8
10
12 SF - IA result, PB, No FSIO. Benhar’s calc.
TiGENIE v.2.8.0+
courtesy of O. Benhar, N. Farina, H. Nakamura, M. Sakuda, R. Seki PRD 72, 053005 (2005)
Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
]2 [GeV2Q0 0.2 0.4 0.6 0.8 1 1.2 1.4
/sr G
eV]
2cm
-38
[10
2/d
Qmd
0
2
4
6
8
10
12
14 RFG - IA result, No FSIO. Benhar’s calc.
TiGENIE v.2.8.0+
Neutrino Cross-Section
�13
]2 [GeV2Q0 0.2 0.4 0.6 0.8 1 1.2 1.4 1.6 1.8 2
/sr G
eV]
2cm
-38
[10
2/d
Qmd
0
2
4
6
8
10
12
14 RFG (no PB)RFG (PB)SF (PB) very good agreement between
simulation and theoretical calculation on Q2
Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
Neutrino Cross-Section
�14
[GeV]µE0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9
/MeV
]2
fm-1
4 [1
0µ
/dE
md
0
0.5
1
1.5
2
2.5
3RFG - IA results, No FSI
O. Benhar’s calc.
GENIE v.2.8.0+v T
[GeV]µE0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9
/MeV
]2
fm-1
4 [1
0µ
/dE
md0
0.5
1
1.5
2
2.5SF - IA results, No PB, No FSI
O. Benhar’s calc.GENIE v.2.8.0+v T
courtesy of O. Benhar, N. Farina, H. Nakamura, M. Sakuda, R. Seki PRD 72, 053005 (2005)
Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
courtesy of A. M. Ankowski nucl-th/0608014v1 4 Aug 2006 courtesy of A. M. Ankowski, Jan T. Sobczyk PRC 77, 044311 (2008)
Neutrino Cross-Section
�15
very good agreement between simulation and theoretical calculation. however, Ar is now an approximation and more calculations are needed
�16
Neutrino Cross-Section GENIE vs. GiBUU vs. NuWro
vs. O. Benhar’s cal.
Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
2 2
�17
Neutrino Cross-Section
Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
]2 [GeV2Q0 0.02 0.04 0.06 0.08 0.1 0.12 0.14 0.16 0.18 0.2
prob
. [.0
2 pe
r bin
]
0
0.05
0.1
0.15
0.2
0.25
0.3
0.35 = 0.2 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 0.2 GeV - SF (PB)µi
C at E12 on 2Q
]2 [GeV2Q0 0.05 0.1 0.15 0.2 0.25 0.3 0.35 0.4
prob
. [.0
2 pe
r bin
]
0
0.02
0.04
0.06
0.08
0.1
0.12
= 0.3 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 0.3 GeV - SF (PB)µi
C at E12 on 2Q]2 [GeV2Q
0 0.1 0.2 0.3 0.4 0.5 0.6
prob
. [.0
2 pe
r bin
]
0
0.01
0.02
0.03
0.04
0.05
0.06
0.07
0.08
= 0.4 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 0.4 GeV - SF (PB)µi
C at E12 on 2Q
2 2
�18
Neutrino Cross-Section
Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
]2 [GeV2Q0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8
prob
. [.0
2 pe
r bin
]
0
0.01
0.02
0.03
0.04
0.05
= 0.5 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 0.5 GeV - SF (PB)µi
C at E12 on 2Q
]2 [GeV2Q0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1
prob
. [.0
2 pe
r bin
]
0
0.01
0.02
0.03
0.04
0.05
= 0.6 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 0.6 GeV - SF (PB)µi
C at E12 on 2Q]2 [GeV2Q
0 0.2 0.4 0.6 0.8 1 1.2
prob
. [.0
2 pe
r bin
]
0
0.005
0.01
0.015
0.02
0.025
0.03
0.035
0.04
= 0.7 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 0.7 GeV - SF (PB)µi
C at E12 on 2Q
]2 [GeV2Q0 0.2 0.4 0.6 0.8 1 1.2 1.4
prob
. [.0
2 pe
r bin
]
0
0.005
0.01
0.015
0.02
0.025
0.03
0.035
0.04
= 0.8 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 0.8 GeV - SF (PB)µi
C at E12 on 2Q
2 2
�19
Neutrino Cross-Section
Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
]2 [GeV2Q0 0.2 0.4 0.6 0.8 1 1.2 1.4 1.6
prob
. [.0
2 pe
r bin
]
0
0.005
0.01
0.015
0.02
0.025
0.03
0.035
= 0.9 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 0.9 GeV - SF (PB)µi
C at E12 on 2Q
]2 [GeV2Q0 0.2 0.4 0.6 0.8 1 1.2 1.4 1.6
prob
. [.0
2 pe
r bin
]
0
0.005
0.01
0.015
0.02
0.025
0.03
0.035
= 1.0 GeV - SF (PB)µi
C at E12 on 2QSF (PB on, FSI off)
TiGENIE 2.8.0+
NuWroGiBUU 1.6
= 1.0 GeV - SF (PB)µi
C at E12 on 2Q
[GeV]µE0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9
/MeV
]2
fm-1
4 [1
0µ
/dE
md
0
0.5
1
1.5
2
2.5No PB, No FSI
TiGENIE v.2.8.0+NuWroO. Benhar’s calc.
= 0.8 GeV - SF (no PB, no FSI)µi
C at E12 on µE
besides silencing FSI, turning off PB, too. compare simulated results to the theoretical calculation
2 2
�20Chun-Min Jen, Center for Neutrino Physics, Virginia Tech
Q2 (with PB on) is quite similar in RFGM and SF. You see the similarity of Q2 within GENIE, GiBUU and NuWro. But, this similarity cannot exactly tell you which nuclear model you used to compute Q2.
!
However, if you look at Emu. The difference in the nuclear model option reveals (because it influences the phase space, (|q|,w), at the interaction vertex). That is, the shape of Emu reflects which nuclear model you apply to computing your cross-section. We have seen that Emu from GiBUU is very close to the one derived from RFGM in GENIE and NuWro. !
That implies NO SF in GiBUU.
�21Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech
Does the nuclear model influence the extracted
neutrino oscillating parameters?
�22Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech
Using GLoBES analysis to “quantify” the answer by feeding one toy model
this toy model is developed by adapting T2K flux and near detector’s efficiency. Note: this is just a toy model used to simplify the simulation loading. this simulation is NOT exclusively for T2K experiment.
P. Coloma and P. Huber Phys.Rev. Lett.111, 221802 (2013)
O. Lalakulich, U. Mosel, and K. Gallmeister, Phys.Rev. C86, 054606 (2012), 1208.3678.
Experimental Setup
• Ideal&and&perfect&near&detector&(12C&or&16O),&1&km,&1kton&
• Far&detector&at&295&km,&22.5&kton&– Oxigen&– Carbon&(RFG&and&SF)&
• Use&T2K&flux,&peak&at&0.6&GeV,&750kW,&5&years&running&
• Use&SK&reconstrucNon&efficiency&as&funcNon&of&energy&
• Use&migraNon&matrices&produced&by&GiBUU(1.6),&GENIE(2.8.0)&and&GENIE&2.8.0+νT&
• Muon&neutrino&disappearance&only&V>&fit&to&atmospheric¶meters&
Workshop&on&neutrinoVnucleus&InteracNons& Okayama,&March&24,&2014& 18&
GENIE 2.8.0+νT Migration Matrix is reconstructed energies as a function of true energies
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech
- Simulation
Oxygen
�23
inputs for GLoBES Fit
Go#beyond#simple#case#(arxiv:1311.4506,1402.6651)#
• Use#different#nuclear#models#C#RFG#and#SF#C#and#evaluate#effects#on#neutrino#oscillaGon#parameters#
• Use#one#neutrino#generator#(GiBUU)#to#simulate#the#nuclear#effects#and#use#another#neutrino#generator#(GENIE)#to#extract#the#oscillaGon#parameters#
• In#a#real#experiment#the#“real”#effects#from#data#will#be#used#in#the#oscillaGon#analysis#together#with#“some”#simulaGon#of#nuclear#effects#
• Neutrino#generators#are#“enough”#different#to#help#understanding#what#will#be#the#effect#of#different#nuclear#models#on#neutrino#oscillaGon#analyses#
Workshop#on#neutrinoCnucleus#
InteracGons#Okayama,#March#24,#2014# 19#
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�24
Phys. Rev. D 89, 073015 (2014)
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech
SF - reconstructed from the true QE dynamics
true
1, 2 and 3σ allowed regions
the event distribution is a convolution of cross-section, flux, detector efficiency, oscillation probability and migration matrix different nuclear models consider different nuclear effects in treating nucleon’s kinematics as a result, event distributions are different for different nuclear models
GLoBES Fit
�25
hep-ex/1402.6651v2
Summary of results
Workshop(on(neutrino.nucleus(Interac3ons( Okayama,(March(24,(2014( 37(
Input “true” Values
Fitted Values
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�26
Summary of results cont’d
Workshop(on(neutrino.nucleus(Interac3ons( Okayama,(March(24,(2014( 38(
Input “true” Values
Fitted Values
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�27
Conclusions
due to the lack of knowledge in Argon structure functions, taking electron data at JLab is needed.
the systematics uncertainty of nuclear models for extracted oscillating parameters can be more exactly determined.
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�28
Acknowledgement : A. Ankowski, O. Benhar, P. Coloma, D. Day, S. Dytman, D. Higinbotham, P. Huber, C. Mariani
BACKUP
�29Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech
N U C L E A R M O D E L S TA N D A R D S H E L L M O D E L
I N D E P E N D E N T PA RT I C L E S H E L L M O D E L ( I P S M )
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�30
all nucleons are bounded
✤ the energy of each shell is a delta function ✤ all nucleons feel the same force acting on them as a result of a mean field potential ✤ absence of position correlation in the ground state wave function between each
pair of nucleons
the well-depth is determined by being adjusted to re-produce the measured Ebinding or Emiss
mean field potential
/binding
0th-order (the most naive model - Fermi Gas Model) : no N-N correlation; all nucleons sitting on bound states are regarded as quasi-free particles
average volume (number) density = 0.16 GeV/fm3
courtesy of D. Day
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�31
1P1/2
(de Forest)
P ~ 1/L ~ (1/V)1/3
momentum density n(k) <—> charge (~ proton) density
experimental momentum distribution is dramatically different from the one predicted by RFGM.
strong evidence proves the existence of N-N correlations in the ground state wave function
the difference in charge density between two nuclei shows that one single shell state is absent in one nucleus but is present in the other
parallel kinematics
Mott
courtesy of D. Day
N U C L E A R M O D E L S TA N D A R D — — > M O D I F I E D S H E L L M O D E L
T H E N AT U R E O F N - N C O R R E L AT I O N S ( Q U A L I TAT I V E )
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech
1. N-N (position) correlation is formed by the nucleon charge density distribution and leads to the individual shell structure for each specific nucleus (different A, different Z)
2. N-N correlation causes the overlap between adjacent shells and thus produces the strong short-range repulsive force
3. N-N correlation force is universal for all nuclei (how do we know? - see the next slide) 4. N-N correlation force is quite similar to the type of force acting on quasi-free nucleons
�32
courtesy of D. Day
N U C L E A R M O D E L S TA N D A R D — — > M O D I F I E D S H E L L M O D E L
W H AT I S S P E C T R O S C O P I C FA C T O R ? ( Q U A N T I TAT I V E D E S C R I P T I O N O F N - N I N T E R A C T I O N S )
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�33
spectroscopic factor is extracted by taking the ratio of the experimental cross-section to the theoretical one.
✦ spectroscopic factor tells you the number of bound-state (valence orbital - near Fermi sea) nucleons interacting with the incoming beam particles
✦ spectroscopic factor reflects the evidence of presence of short-range N-N correlations; the stronger N-N correlations; the more reduction the spectroscopic factor is (no N-N, Zn = 1)
✦ spectroscopic factor also manifests the existence of long-range N-N correlations, leading to 2p2h ✦ spectroscopic factor is not the same as the occupation number, for the spectroscopic factor is
determined by integrating the probability of knocking out “one” bound-state nucleon associated with one quantum number and meanwhile leaving the residual system with an excitation energy over the Emiss of bound states. the occupation number instead tells you the total number of nucleons from both bound and continuous states, so it’s always larger than the spectroscopic factor.
final-state (one-hole) initial-statecourtesy of O. Benhar
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�34
shapes of tail structures above Fermi sea are nearly the same for different nuclei <—> N-N short-range correlation effect is universal for all nuclei (spectroscopic factor is similar for light/medium/heavy nuclei)
courtesy of D. Day
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�35
Take 40Ca - proton separation energy
1S1/2
1P3/21P1/2
courtesy of O. Benhar
1d3/2
2S1/21d5/2
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�36
Take 40Ca Structure Functions - proton’s momentum distribution (bound states only)
courtesy of O. Benhar
Chun-Min (Mindy) Jen, Center for Neutrino Physics, Virginia Tech�37
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