Quark’s angular momentum densities in position space

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Presentation transcript:

Quark’s angular momentum densities in position space Based on: LM, Lorcé, Pasquini (in preparation) Luca Mantovani 1

Outline Angular Momentum definitions Densities in position space 3D space Impact-parameter space Results in the Scalar Diquark Model Summary and conclusions 2

Angular momentum definitions See talk by C. Lorcé 3

Field-theoretical definition Lagrangian invariant under Lorentz transformations 4

Field-theoretical definition Lagrangian invariant under Lorentz transformations Noether’s theorem Generalized Angular Momentum density 4

Field-theoretical definition Lagrangian invariant under Lorentz transformations Noether’s theorem Generalized Angular Momentum density Canonical Energy-Momentum Tensor In general: 4

Field-theoretical definition Lagrangian invariant under Lorentz transformations Noether’s theorem Generalized Angular Momentum density Space components Spin Total AM Orbital Angular Momentum (OAM) 4

Belinfante’s improved EMT Belinfante, Rosenfeld (1940) 5

Belinfante’s improved EMT Belinfante’s Generalized Angular Momentum density with Belinfante, Rosenfeld (1940) 5

Belinfante’s improved EMT Belinfante’s Generalized Angular Momentum density with Belinfante, Rosenfeld (1940) 5

Canonical vs Belinfante’s total AM 6

Canonical vs Belinfante’s total AM Clear distinction between OAM and spin at the density level Purely OAM density 6

Canonical vs Belinfante’s total AM Clear distinction between OAM and spin at the density level Purely OAM density In general non-symmetric Symmetric 6

Canonical vs Belinfante’s total AM Clear distinction between OAM and spin at the density level Purely OAM density In general non-symmetric Symmetric Density level: Integrating: 6

Canonical vs Belinfante’s total AM Clear distinction between OAM and spin at the density level Purely OAM density In general non-symmetric Symmetric Density level: Integrating: No reason a priori to choose the Belinfante’s version 6

Kinetic EMT in QCD Ji (1997) 7

We focus on the quark part Kinetic EMT in QCD Ji (1997) We focus on the quark part 7

Kinetic EMT in QCD We focus on the quark part Ji (1995) We focus on the quark part The quark’s spin density is 7

Kinetic vs Belinfante’s quark EMT 8

Kinetic vs Belinfante’s quark EMT Total AM 8

Kinetic vs Belinfante’s quark EMT Total AM Total AM 8

Kinetic vs Belinfante’s quark EMT Total AM Total AM Non-symmetric Symmetric 8

Form factors of the kinetic EMT Bakker, Leader, Trueman (2004) The average position is Fourier conjugate of 9

Form factors of the EMT 9

Form factors of the quark spin operator 10

Form factors of the quark spin operator Axial-vector form factor Induced-pseudoscalar form factor From QCD Equations of motion 10

Densities in position space 11

OAM density in four-dimensional space 12

OAM density in four-dimensional space From on-shell conditions: depends on !! 12

OAM density in four-dimensional space From on-shell conditions: depends on !! Explicit dependence on time 12

Breit frame densities 13

Breit frame densities True density with probabilistic interpretation 13

Breit frame densities True density with probabilistic interpretation With form factors True density with probabilistic interpretation 13

Breit frame densities OAM 14

Breit frame densities OAM Belinfante’s total AM 14

Breit frame densities OAM Belinfante’s total AM Spin

Breit frame densities OAM Belinfante’s total AM Spin 14

Breit frame densities OAM Belinfante’s total AM Spin Surface term 14

Breit frame densities OAM Belinfante’s total AM Spin Surface term 14

Breit frame densities Belinfante’s total AM 15

Breit frame densities Belinfante’s total AM Monopole contribution 15

Breit frame densities Belinfante’s total AM Monopole contribution Quadrupole contribution Often discarded in the literature! Polyakov (2003) Goeke et al. (2007) 15

Elastic frame densities 16

Elastic frame densities 2D densities in the impact-parameter space 16

Elastic frame densities 2D densities in the impact-parameter space We consider only the longitudal components No explicit dependence on 16

Light-front densities Light-cone coordinates OAM density 17

Light-front densities Light-cone coordinates OAM density 17

Light-front densities Light-cone coordinates OAM density Drell-Yan frame (also ) Burkardt (2002) 17

Light-front densities Light-cone coordinates OAM density Drell-Yan frame (also ) Burkardt (2002) 2D densities in the impact-parameter space 17

Light-front densities 18

Light-front densities Instant form in elastic frame for is equivalent to light-front 18

Densities in the impact-parameter space Fourier transform of the form factors in the space OAM density 19

Densities in the impact-parameter space OAM Belinfante’s total AM Spin Surface term 20

Densities in the impact-parameter space Belinfante’s total AM Monopole contribution Quadrupole contribution 21

Results in the scalar diquark model See Adhikari, Burkardt (2016) 22

Scalar diquark model Nucleon, mass 23

~ Scalar diquark model Spin 0 diquark, mass Nucleon, mass Spin 1/2 active quark, mass 23

~ Scalar diquark model Spin 0 diquark, mass Nucleon, mass Spin 1/2 active quark, mass Yukawa coupling No gauge field 23

Quark’s Light-Front Wave Functions 24

Quark’s Light-Front Wave Functions Adhikari, Burkardt (2016) Probabilistic interpretation 24

Quark’s Light-Front Wave Functions Adhikari, Burkardt (2016) Probabilistic interpretation Brodsky, Diehl, Hwang (2000) 24

Form factors of the EMT For both quark and gluon components GPD Bakker, Leader, Trueman (2004) GPD 25

Form factors in LFWF representation 26

Form factors in LFWF representation Form factors from GPDs in impact-parameter space Ji (1997) Diehl (2003) 26

Form factors in LFWF representation Form factors from GPDs in impact-parameter space GPDs overlap representation Ji (1997) Diehl (2003) Burkardt, Hwang (2004) 26

Kinetic OAM 27

OAM directly from LFWFs Scalar Diquark Model has no gauge field Jaffe-Manohar OAM 27

OAM directly from LFWFs Scalar Diquark Model has no gauge field Jaffe-Manohar OAM 27

OAM directly from LFWFs = Valid for all models with no gauge fields 28

Kinetic OAM 29

Kinetic spin term 29

Kinetic total AM 29

Kinetic OAM 30

Belinfante’s AM 30

Belinfante’s and kinetic total AM 30

Belinfante’s and kinetic total AM 30

Belinfante’s and kinetic total AM 30

Belinfante’s monopole contribution 31

Belinfante’s monopole contribution 31

Belinfante’s quadrupole contribution 31

Belinfante’s quadrupole contribution 31

Summary and conclusions 32

Summary while when integrating I discussed the densities of angular momentum in position space, in 3D (Breit frame) and 2D (Elastic frame and light front). Comparison between kinetic and Belinfante’s version of the quark EMT: at the density level, we have while when integrating 33

Summary Elastic frame DY frame I discussed the densities of angular momentum in position space, in 3D (Breit frame) and 2D (Elastic frame and light front in the Drell-Yan frame). Elastic frame DY frame 33

Summary Longitudinal components Breit frame Elastic frame DY frame I discussed the densities of angular momentum in position space, in 3D (Breit frame) and 2D (Elastic frame and light front in the Drell-Yan frame). Longitudinal components Breit frame Elastic frame DY frame 33

Summary Longitudinal components Breit frame Elastic frame DY frame I discussed the densities of angular momentum in position space, in 3D (Breit frame) and 2D (Elastic frame and light front in the Drell-Yan frame). Longitudinal components Breit frame Elastic frame DY frame 33

Summary Longitudinal components Breit frame Elastic frame DY frame I discussed the densities of angular momentum in position space, in 3D (Breit frame) and 2D (Elastic frame and light front in the Drell-Yan frame). Longitudinal components Breit frame Elastic frame DY frame 33

Summary Longitudinal components Breit frame Elastic frame DY frame I discussed the densities of angular momentum in position space, in 3D (Breit frame) and 2D (Elastic frame and light front in the Drell-Yan frame). Longitudinal components Breit frame Elastic frame DY frame 33

Summary Longitudinal components Breit frame Elastic frame DY frame I discussed the densities of angular momentum in position space, in 3D (Breit frame) and 2D (Elastic frame and light front in the Drell-Yan frame). Longitudinal components Breit frame Elastic frame DY frame Crucial at the density level Compare with Adhikari, Burkardt (2016), Polyakov (2003), Goeke et al. (2007) 33