Analogies between Lattice QCD and the Truncated Nambu–Jona-Lasinio Model
Abstract
:1. Introduction
- (i)
- A solvable model is formulated which can support the validity of the popular Hartree–Fock approximation for massive constituent quarks together with the random phase approximation (RPA) for pions in the full Nambu–Jona-Lasinio model. It also supports the meaningfulness of the limit of large numbers of colours.
- (ii)
- Lattice models as well as few-body models with a finite Hilbert space do not provide a continuum description of the two-body decay channel. Instead, the diagonalization of the Hamiltonian yields a discrete spectrum which hides a lot of information about the relevant continuum which one is trying to extract. As an example, approximate methods for scattering at low energy, as well as via the meson resonance, are studied. It is shown how the discrete eigenvalue spectrum can provide some information on scattering using the first order Born approximation, in analogy to the Luscher formula used in Lattice QCD for the same dilemma of how to extract scattering from a discrete spectrum.
2. The Two-Level Quasispin Model
- (i)
- Periodic box of volume ;
- (ii)
- A sharp three-momentum cut-off ;
- (iii)
- An average kinetic energy for all momentum states ;
- (iv)
- Restriction to one flavour of quarks ;
- (v)
- Truncation of interaction.
- In the large N limit, the exact results of the quasispin model tend, in fact, to the Hartree–Fock and RPA values, which is a popular approximation for full NJL.
- The spectrum of the “ground state band” (Table 1) is almost equidistant and can be interpreted as multipion states. The energy deficit can be assumed to be due to an attractive average pion–pion interaction:
- This average potential is, in fact, proportional to the density of each pion, , which supports such an interpretation.
- The idea of an average pion–pion potential allows us to calculate the pion–pion scattering length a in the first order Born approximation ( equivalent to the so-called Lüscher formula which is frequently used in the literature [17,18,19]) , which is qualitatively consistent with the two-flavour experimental analysis of Lesniak, or [20].
- The parity of multipion states alternates. There are, however, intruders which do not follow the alternation. In Table 1, they are written in boldface and the lowest can be interpreted as the meson (now called a(500)). The sigma meson is not a six-pion state but an intruder at the position around six pions; it has an overlap with a decaying two-pion state. Also, the states around may be perturbed by admixtures of .
3. Some Lessons for Lattice-like Models
4. The Width of the Sigma Meson
5. Conclusions
Funding
Data Availability Statement
Conflicts of Interest
References
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n | Parity | E − E0 | E − E0 | ||||
---|---|---|---|---|---|---|---|
N= 144 | N= 144 | N= 144 | N= 192 | N= 192 | N= 192 | ||
8 | + | 771 | 4 | −11.3 | 861 | 59 | −8.3 |
7 | − | 767 | 121 | −8.8 | 802 | 93 | −7.3 |
6 | + | 646 | 66 | −11.4 | 709 | 98 | −7.3 |
6 | + | 634 | (−12.2) | 655 | (−10.9) | ||
5 | − | 580 | 98 | −10.0 | 611 | 108 | −7.2 |
4 | + | 482 | 114 | −10.5 | 503 | 115 | −7.1 |
3 | − | 378 | 117 | −10.1 | 388 | 122 | −7.1 |
2 | + | 261 | 125 | −10.3 | 266 | 129 | −7.1 |
1 | − | 136 | 136 | 137 | 137 | ||
0 | + | 0 | 0 |
Pion Mass | 136 | 180 | 254 | 355 | 433 | 499 |
---|---|---|---|---|---|---|
(order 1) | 779 | 840 | 914 | 959 | 964 | 959 |
(order 2) | 538 | 613 | 724 | 853 | 925 | 959 |
(order 1) | 240 | 220 | 178 | 100 | 36 | 0 |
(order 2) | 940 | 818 | 576 | 242 | 64 | 0 |
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Rosina, M. Analogies between Lattice QCD and the Truncated Nambu–Jona-Lasinio Model. Symmetry 2024, 16, 607. https://doi.org/10.3390/sym16050607
Rosina M. Analogies between Lattice QCD and the Truncated Nambu–Jona-Lasinio Model. Symmetry. 2024; 16(5):607. https://doi.org/10.3390/sym16050607
Chicago/Turabian StyleRosina, Mitja. 2024. "Analogies between Lattice QCD and the Truncated Nambu–Jona-Lasinio Model" Symmetry 16, no. 5: 607. https://doi.org/10.3390/sym16050607
APA StyleRosina, M. (2024). Analogies between Lattice QCD and the Truncated Nambu–Jona-Lasinio Model. Symmetry, 16(5), 607. https://doi.org/10.3390/sym16050607