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A Consistent Thermodynamic Treatment for Quark Mass Density-Dependent Model. Ru-Keng Su Physics Department Fudan University. Difficulties. In relativistic energy dispersion relation: Ω becomes an explicit function of m:
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A Consistent Thermodynamic Treatment for Quark MassDensity-Dependent Model Ru-Keng Su Physics Department Fudan University
Difficulties • In relativistic energy dispersion relation: • Ω becomes an explicit function of m: • How will the thermodynamic formulae with the partial derivatives become?
A. Different treatments with extra terms from partial derivatives
B. O. G. Benvenuto and G. Lugones, Phys. Rev. D 51, 1989 (1995) G. Lugones and O. G. Benvenuto, ibid. 52, 1276 (1995)
C. G. X. Peng, et. al. Phys. Rev. C 59, 3452 (1999) G. X. Peng, et. al. Phys. Rev. C 62, 025801(2000) X. J. Wen, et. al. Phys. Rev. C 72, 015204(2005)
Inconsistency of Traditional Thermodynamic Treatments with Partial Derivative • Differential relation for reversible process • Ω = Ω(T, V, μ). • If m*=m*(T,ρ), Ω = Ω(T, V, μ, m*(T,ρ), ), the Massieu’s Theorem breaks down.
For QMDD Model • ρ=N/V →μ, fixed {T,μ} equals fixed {T,ρ} • Change V, N must change, too.
According to , we write down the invariables explicitly
Reversible Process fix t equilibrium state • Suppose T=T0, ρ=ρ0, m*(T, ρ)=m*(T0,ρ0) • All formulae in equilibrium state are applicable
Thermodynamic Consistent Treatment • In equilibrium state
Our treatment can be expressed by considering the quasi-particle mass as independent variable
Ordinary thermodynamic variables depend on the collection of the subsystem only. • Mass is an intrinsic quantity of a particle, it does not affect on collective thermodynamic properties. • Effective mass m*(T, ρ) includes dynamic interaction, confinement mechanism, etc.
But the macro thermodynamic variables cannot describe these micro dynamic interactions. We must choose new variables to represent these dynamic interactions or the medium effect. • Introducing m* in quasiparticle physical picture to represent the medium effect and taking it as a variable is a twin in thermodynamics of quasiparticle system.
Old treatment Our treatment
Our treatment Old treatment I Old treatment II
Contribution of Vacuum • Within the statistical frame, the pressure is positive definite, p=-Ω/V>0 • In MIT bag model, B0 is added to energy while subtracted in pressure as vacuum contribution, negative pressure can be realized
Ω0(ρB) can be obtained by integration Constraint on Vacuum
Conclusion • For model Hamiltonian with effective mass quasiparticles, an intrinsic degree of freedom m* must be introduced • All ambiguities are solved • Correct physical picture after the vacuum is introduced
PRC Referee’s Report • This is an interesting paper which should be published in PRC. The authors explain the inconsistencies in previous thermodynamical treatments of quark matter within the quark mass density-dependent model and show how the model can be used self-consistently by introducing the quasiparticle mass as a new independent variable. This leads to reasonable numerical results resembling those obtained with the MIT bag model, but more importantly it leads to an improved understanding of the physics. • In fact as the authors mention in the paper their method may be more widely applicable to other systems where medium effects can be described by an effective mass, and my only suggestion for changes in the manuscript is to include this statement in the Abstract in order to attract more readers from other subfields.
