Hagedorn temperature

The Hagedorn temperature, T_H, is the temperature in theoretical physics where hadronic matter (i.e. ordinary matter) is no longer stable, and must either "evaporate" or convert into quark matter; as such, it can be thought of as the "boiling point" of hadronic matter. It was discovered by Rolf Hagedorn. The Hagedorn temperature exists because the amount of energy available is high enough that matter particle (quark–antiquark) pairs can be spontaneously pulled from vacuum. Thus, naively considered, a system at Hagedorn temperature can accommodate as much energy as one can put in, because the formed quarks provide new degrees of freedom, and thus the Hagedorn temperature would be an impassable absolute hot. However, if this phase is viewed as quarks instead, it becomes apparent that the matter has transformed into quark matter, which can be further heated.

The Hagedorn temperature, T_H, is about 150 MeV/k_B or about 1.7×10¹² K,^[1] little above the mass–energy of the lightest hadrons, the pion.^[2] Matter at Hagedorn temperature or above will spew out fireballs of new particles, which can again produce new fireballs, and the ejected particles can then be detected by particle detectors. This quark matter has been detected in heavy-ion collisions at SPS and LHC in CERN (France and Switzerland)^{[citation needed]} and at RHIC in Brookhaven National Laboratory (USA)^{[citation needed]}.

In string theory, a separate Hagedorn temperature can be defined for strings rather than hadrons. This temperature is extremely high (10³⁰ K) and thus of mainly theoretical interest.^[3]

History

The Hagedorn temperature was discovered by German physicist Rolf Hagedorn in the 1960s while working at CERN. His work on the statistical bootstrap model of hadron production showed that because increases in energy in a system will cause new particles to be produced, an increase of collision energy will increase the entropy of the system rather than the temperature, and "the temperature becomes stuck at a limiting value".^[4][5]

Technical explanation

Hagedorn temperature is the temperature T_H above which the partition sum diverges in a system with exponential growth in the density of states.^[4][6]

${\displaystyle \lim _{T\rightarrow T_{\rm {H}}^{-}}\operatorname {Tr} \left[e^{-\beta H}\right]=\infty }$

Because of the divergence, people may come to the incorrect conclusion that it is impossible to have temperatures above the Hagedorn temperature, which would make it the absolute hot temperature, because it would require an infinite amount of energy. In equations:

${\displaystyle \lim _{T\rightarrow T_{\rm {H}}^{-}}E=\lim _{T\rightarrow T_{\rm {H}}^{-}}{\frac {\operatorname {Tr} \left[He^{-\beta H}\right]}{\operatorname {Tr} \left[e^{-\beta H}\right]}}=\infty }$

This line of reasoning was well known to be false even to Hagedorn. The partition function for creation of hydrogen–antihydrogen pairs diverges even more rapidly, because it gets a finite contribution from energy levels that accumulate at the ionization energy. The states that cause the divergence are spatially big, since the electrons are very far from the protons. The divergence indicates that at a low temperature hydrogen–antihydrogen will not be produced, rather proton/antiproton and electron/antielectron. The Hagedorn temperature is only a maximum temperature in the physically unrealistic case of exponentially many species with energy E and finite size.

The concept of exponential growth in the number of states was originally proposed in the context of condensed matter physics. It was incorporated into high-energy physics in the early 1970s by Steven Frautschi and Hagedorn. In hadronic physics, the Hagedorn temperature is the deconfinement temperature.

In string theory

In string theory, it indicates a phase transition: the transition at which very long strings are copiously produced. It is controlled by the size of the string tension, which is smaller than the Planck scale by some power of the coupling constant. By adjusting the tension to be small compared to the Planck scale, the Hagedorn transition can be much less than the Planck temperature. Traditional grand unified string models place this in the magnitude of 10³⁰ kelvin, two orders of magnitude smaller than the Planck temperature. Such temperatures have not been reached in any experiment and are far beyond the reach of current, or even foreseeable technology.

See also

• Heat
• Thermodynamic temperature
• Non-extensive self-consistent thermodynamical theory

References

1. Gaździcki, Marek; Gorenstein, Mark I. (2016), Rafelski, Johann (ed.), "Hagedorn's Hadron Mass Spectrum and the Onset of Deconfinement", Melting Hadrons, Boiling Quarks – From Hagedorn Temperature to Ultra-Relativistic Heavy-Ion Collisions at CERN, Springer International Publishing, pp. 87–92, arXiv:1502.07684, Bibcode:2016mhbq.book...87G, doi:10.1007/978-3-319-17545-4_11, ISBN 978-3-319-17544-7
2. Cartlidge, Edwin (23 June 2011). "Quarks break free at two trillion degrees". Physics World. Retrieved 27 January 2014.
3. Atick, Joseph J.; Witten, Edward (1988). "The Hagedorn transition and the number of degrees of freedom of string theory". Nuclear Physics B. 310 (2): 291. Bibcode:1988NuPhB.310..291A. doi:10.1016/0550-3213(88)90151-4.
4. Ericson, Torleif; Rafelski, Johann (4 September 2003). "The tale of the Hagedorn temperature". CERN Courier. Retrieved 2016-12-09.
5. Rafelski, Johann, ed. (2016). Melting Hadrons, Boiling Quarks – From Hagedorn Temperature to Ultra-Relativistic Heavy-Ion Collisions at CERN. Cham: Springer International Publishing. Bibcode:2016mhbq.book.....R. doi:10.1007/978-3-319-17545-4. ISBN 978-3-319-17544-7.
6. Tyson, Peter (December 2007). "Absolute Hot: Is There an Opposite to Absolute Zero?". NOVA. Retrieved 2008-12-21.