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Measuring the temperature. Thermometer ( direct contact ) dilatation a ir pressure m echanical or electric stress Chemistry ( mixture ) color mass ratios hadronic composition Spectra ( telemetrics ) a stronomy ( photons ) pT spectra of light and heavy particles
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Measuringthetemperature • Thermometer (directcontact) • dilatation • air pressure • mechanicalorelectricstress • Chemistry (mixture) • color • massratios • hadroniccomposition • Spectra (telemetrics) • astronomy (photons) • pTspectra of light and heavyparticles • multiplicityfluctuations
Measuringthetemperature • Thermometer (directcontact) • dilatation • air pressure • mechanicalorelectricstress • Chemistry (mixture) • color • massratios • hadroniccomposition • Spectra (telemetrics) • astronomy (photons) • pTspectra of light and heavyparticles • multiplicityfluctuations
Interpretingthetemperature • Thermodynamics (universality of equilibrium) • zeroththeorem (Biro+Van PRE 2011) • derivative of entropy • Boyle-Mariottetypeequation of state • Kinetictheory (equipartition) • energy / degree of freedom • fluctuation - dissipation • otheraveragevalues • Spectralstatistics (abstract) • logarithmicslopeparameter • observedenergyscale • dispersion / power-laweffects
Tsallis quark matter + transverse flow + quark coalescence fits to hadron spectra with Károly Ürmössy RHIC data JPG: SQM 2008, Beijing
Tsallis quark matter + transverse flow + quark coalescence fits to hadron spectra with Károly Ürmössy RHIC data JPG: SQM 2008, Beijing
arXiV: 1111.4817 -> PLB: Unruh gamma radiationat RHIC ? with Miklós Gyulassy and Zsolt Schram Constantacceleration* is aliketemperature… Softbremsstrahlung: high k_T exp, low k_T 1 / square; longacceleration: Bjorken shortacceleration: Landauhydro * Whataboutnon-constant, non time-symmetricacceleration? Mimickingthermalsources byUnruhradiation T.S.Biró¹, M.Gyulassy² and Z.Schram³ ¹ MTA KFKI RMKI MTA Wigner Research Centre RMI ²University of Columbia, ³University of Debrecen Exploring QCD Frontiers: from RHIC and LHC to EIC, Jan. 30. – Feb. 03. 2012, Stellenbosch, Republic of South-Africa
Whydostatisticswork ? • Independentobservation over 100M events • Universallawsforlargenumbers • Steadynoiseinenvironment: ‚reservoir’ • Phasespacedominance • Bychancethedynamicsmimicsthermalbehavior
Canonical distribution with Rényi entropy This cut power-law distribution is an excellent fit to particle spectra in high-energy experiments!
Fit and physicswith Rényi entropy The cut power-law distributionis an excellentfit, butitgivessmallervaluesfortheparameter hat(T) atthesameTthanthe Boltzmann form!
NBD = Euler ○ PoissonPower Law = Euler ○ Gibbs S u p e r s t a t i s t i c s
Arxiv: 1111.4817 Phys.Lett. B, 2012 Ourview
Experimentalmotivation: apparentlythermalphotons RHIC: PHENIX
Theoreticalmotivation • Decelerationduetostopping • Schwingerformula + Newton +Unruh= Boltzmann Satz, Kharzeev, …
WhyPhotons (gammas) ? • Zeromass: flow – Doppler, easykinematics • Colorneutral: escapesstronginteraction • Couplestocharge: Z / A sensitive • Classicalfieldtheoryalsopredictsspectra
Soft bremsstrahlung • Jackson formula for the amplitude: With , and the retarded phase
Soft bremsstrahlung • Covariant notation: IR div, coherenteffects Feynmangraphs The Unruheffectcannot be calculatedbyanyfinitenumber of Feynmangraphs!
Kinematics, source trajectory • Rapidity: Trajectory: Let us denote by in the followings!
Kinematics, photon rapidity • Angle and rapidity:
Kinematics, photon rapidity • Doppler factor: Phase: Magnitude of projected velocity:
Intensity, photon number Amplitude as an integral over rapidities on the trajectory: Here is a characteristic length.
Intensity, photon number Amplitude as an integral over infinite rapidities on the trajectory (velocity goes from –c to +c): With K1 Bessel function! Flatinrapidity !
Photon spectrum, limits Amplitude as an integral over infinite rapidities on the trajectory (velocity goes from –c to +c): for for
Apparent temperature • High - infinite proper time acceleration: Connection to Unruh: proper time Fourier analysis of a monochromatic wave
Unruh temperature • Entirely classical effect • Special Relativity suffices Unruh Constant ‚g’ acceleration in a comoving system: dv/d = -g(1-v²) Max Planck
Unruh temperature Planck-interpretation: The temperature in Planck units: The temperature more commonly:
Unruh temperature On Earth’ surface ist is 10^(-19) eV, while at room temperature about 10^(-3) eV.
Unruh temperature Braking from +c to-cin a Compton wavelength: kT ~ 150 MeV if mc² ~ 940 MeV (proton)
Connection to Unruh Fourier component for the retarded phase:
Connection to Unruh Fourier component for the projected acceleration: Photon spectrum in the incoherent approximation:
Connection to Unruh Fourier component for the retarded phase at constant acceleration: KMS relation and Planck distribution:
Connection to Unruh KMS relation and Planck distribution:
Connection to Unruh Note: It is peaked around k = 0, but relatively wide! (an unparticle…)
Transverse flow interpretation Mathematica knows: ( I derived it using Feynman variables) Alike Jüttner distributions integrated over the flow rapidity…
Finite time (rapidity) effects = with Short-timedeceleration Non-uniform rapiditydistribution; Landauhydrodynamics Long-timedeceleration uniform rapiditydistribution; Bjorkenhydrodynamics
Short time constant acceleration Non-uniform rapidity distribution; Landau hydrodynamics
Analytic results x(t), v(t), g(t), τ(t), 𝒜, dN/kdkd limit
Summary • Semiclassical radiation from constant accelerating point charge occursrapidity-flat and thermal • The thermal tail develops at highenough k_perp • At low k_perp the conformal NLO result emerges • Finite time/rapidity acceleration leads to peakedrapiditydistribution, alikeLandau - hydro • Exponentialfitstosurplus over NLO pQCDresultsreveal a ’’pi-timesUnruh-’’ temperature
