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Cornell potential

{{Short description|Simple potential between quarks}}

In particle physics, the Cornell potential is an effective method to account for the confinement of quarks in quantum chromodynamics (QCD). It was developed by Estia J. Eichten, Kurt Gottfried, Toichiro Kinoshita, John Kogut, Kenneth Lane and Tung-Mow Yan at Cornell University

{{cite journal

|last1=Eichten |first1=E.

|last2=Gottfried |first2=K.

|last3=Kinoshita |first3=T.

|last4=Kogut |first4=J. B.

|last5=Lane |first5=K. D.

|last6=Yan |first6=T. M.

|title=Spectrum of charmed quark-antiquark bound states

|journal=Phys. Rev. Lett.

|volume=34 |issue=369

|year=1975

|page=369

|doi=10.1103/PhysRevLett.34.369

|bibcode=1975PhRvL..34..369E

}}

{{cite journal

|last1=Eichten |first1=E.

|last2=Gottfried |first2=K.

|last3=Kinoshita |first3=T.

|last4=Lane |first4=K. D.

|last5=Yan |first5=T. M.

|title=Charmonium: The model

|journal=Phys. Rev. D

|volume=17 |issue=3090

|year=1978

|page=3090

|doi=10.1103/PhysRevD.17.3090

|bibcode=1978PhRvD..17.3090E

}} in the 1970s to explain the masses of quarkonium states and account for the relation between the mass and angular momentum of the hadron (the so-called Regge trajectories). The potential has the form:

{{cite journal

|last1=Brambilla |first1=N.

|last2=Vairo |first2=A.

|title=Quark confinement and the hadron spectrum

|journal=Proceedings of the 13th Annual HUGS AT CEBAF

|year=1998

|arxiv=hep-ph/9904330

|doi=

}}

:V(r) = -\frac{4}{3}\frac{\alpha_s}{\;r\;} + \sigma\,r + \text{constant}

where r is the effective radius of the quarkonium state, \alpha_s is the QCD running coupling, \sigma is the QCD string tension and is a constant of \simeq 0.18 GeV^2. Initially, \alpha_s and \sigma were merely empirical parameters but with the development of QCD can now be calculated using perturbative QCD and lattice QCD, respectively.

Short distance potential

The potential consists of two parts. The first one, -\frac{4}{3}\frac{\alpha_s}{\;r\;} dominate at short distances, typically for r <0.1 fm. It arises from the one-gluon exchange between the quark and its anti-quark, and is known as the Coulombic part of the potential, since it has the same form as the well-known Coulombic potential \;\frac{\alpha}{\;r\;}\; induced by the electromagnetic force (where \alpha is the electromagnetic coupling constant).

The factor \frac{4}{3} in QCD comes from the fact that quarks have different type of charges (colors) and is associated with any gluon emission from a quark. Specifically, this factor is called the color factor or Casimir factor and is C_F \equiv \frac{N_c^2-1}{2N_c}= \frac{4}{3}, where N_c = 3 is the number of color charges.

The value for \alpha_s depends on the radius of the studied hadron. Its value ranges from 0.19 to 0.4.

{{cite journal

|last1=Deur |first1=A.

|last2=Brodsky |first2=S. J.

|last3=de Teramond |first3=G. F.

|title=The QCD Running Coupling

|journal=Prog. Part. Nucl. Phys.

|volume=90 |issue=1

|year=2016

|pages=1–74

|arxiv=1604.08082

|doi=10.1016/j.ppnp.2016.04.003

|bibcode=2016PrPNP..90....1D

|s2cid=118854278

}}

For precise determination of the short distance potential, the running of \alpha_s must be accounted for, resulting in a distant-dependent \alpha_s(r). Specifically, \alpha_s must be calculated in the so-called potential renormalization scheme (also denoted V-scheme) and, since quantum field theory calculations are usually done in momentum space, Fourier transformed to position space.

Long distance potential

The second term of the potential, \sigma\,r, is the linear confinement term and fold-in the non-perturbative QCD effects that result in color confinement. \sigma is interpreted as the tension of the QCD string that forms when the gluonic field lines collapse into a flux tube. Its value is \sigma \sim 0.18 GeV^2.

\sigma controls the intercepts and slopes of the linear Regge trajectories.

Domains of application

The Cornell potential applies best for the case of static quarks (or very heavy quarks with non-relativistic motion), although relativistic improvements to the potential using speed-dependent terms are available. Likewise, the potential has been extended to include spin-dependent terms

Calculation of the quark-quark potential

A test of validity for approaches that seek to explain color confinement is that they must produce, in the limit that quark motions are non-relativistic, a potential that agrees with the Cornell potential.

A significant achievement of lattice QCD is to be able compute from first principles the static quark-antiquark potential, with results confirming the empirical Cornell Potential.

{{cite journal

|last1=Bali |first1=G. S.

|title=QCD forces and heavy quark bound states

|journal=Phys. Rep.

|volume=343 |issue=1

|year=2001

|pages=1–136

|arxiv=hep-ph/0001312

|doi=10.1016/S0370-1573(00)00079-X

|bibcode=2001PhR...343....1B

|s2cid=119050904

}}

Other approaches to the confinement problem also results in the Cornell potential, including the dual superconductor model, the Abelian Higgs model, and the center vortex models.{{Cite book

|last=Greensite |first=J.

|year=2011

|title=An introduction to the confinement problem

|series=Lecture Notes in Physics

|volume=821

|publisher=Springer

|isbn=978-3-642-14381-6

|bibcode=2011LNP...821.....G

|doi=10.1007/978-3-642-14382-3

}}

More recently, calculations based on the AdS/CFT correspondence have reproduced the Cornell potential using the AdS/QCD correspondence{{ cite journal | doi=10.1103/PhysRevD.74.015005 |author1=A. Karch |author2=E. Katz |author3=D. T. Son |author4=M. A. Stephanov | title=Linear Confinement and AdS/QCD |journal=Physical Review D | volume=74 | date=2006 |issue=1 | pages=015005 | arxiv=hep-ph/0602229|bibcode = 2006PhRvD..74a5005K |s2cid=16228097 }}

{{cite journal

|last1=Andreev |first1=O.

|last2=Zakharov |first2=V. I.

|title=Heavy-quark potentials and AdS/QCD

|journal=Phys. Rev. D

|volume=74 |issue=25023

|year=2006

|page=025023

|arxiv=hep-ph/0604204

|doi=10.1103/PhysRevD.74.025023

|bibcode=2006PhRvD..74b5023A

|s2cid=119391222

}}

or light front holography.

{{cite journal

|last1=Trawinski |first1=A. P.

|last2=Glazek |first2=S. D.

|last3=Brodsky |first3=S. J.

|last4=de Teramond |first4=G. F.

|last5=Dosch |first5=H. G.

|title=Effective confining potentials for QCD

|journal=Phys. Rev. D

|volume=90 |issue=74017

|year=2014

|page=074017

|arxiv=1403.5651

|doi=10.1103/PhysRevD.90.074017

|bibcode=2014PhRvD..90g4017T

|s2cid=118644867

}}

See also

References

{{reflist}}

Category:Quantum chromodynamics

Category:Mesons

Category:Quantum mechanical potentials