what is the apparent temperature of relativistically moving bodies ? t.s.biró and p.ván (kfki rmki...
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What is the Apparent
Temperature of Relativistically
Moving Bodies ?
T.S.Biró and P.Ván (KFKI RMKI Budapest)
EMMI, Wroclaw, Poland, EU, 10. July 2009. arXiv: 0905.1650
Max Karl Ernst Ludwig Planck
1858 Apr. 23. Kiel1947 Oct. 04. Göttingen
Cooler by aLorentz factor
Albert Einstein
1879 Mar. 14. Ulm1955 Apr. 18. Princeton
Cooler by aLorentz factor
Danilo Blanusa
1903 Osijek1987 Zagreb
Math professor in Zagreb
Glasnik mat. fiz. i astr. v. 2. p. 249, (1947)
Sur les paradoxes de la notion d’énergie
Hotter by aLorentz factor
Heinrich Ott
1892 - 1962
Student of Sommerfeld
LMU München PhD 1924, habil 1929
Zeitschrift für Physik v. 175. p. 70, (1963)
Lorentz - Transformation der Wärme und
der Temperatur
Hotter by aLorentz factor
Peter Theodore Landsberg
1930 -
Prof. emeritus Univ. Southampton
MSc 1946 PhD 1949 DSc 1966
Nature v. 212, p. 571, (1966)
Nature v. 214, p. 903, (1966)
Does a Moving Body appear Cool?
Equal temperatures
So far it sounds like a
Zwillingsparadox for the
temperature
BUT
Christian Andreas Doppler
1803 Nov 29 Salzburg1853 Mar 27 Venezia
Doppler-crater on the Moon
Doppler red-shift / blue-shift
The Temperature of Moving Bodies
• Planck-Einstein: cooler
• Blanusa - Ott: hotter
• Landsberg: equal
• Doppler - van Kampen: v_rel = 0
T.S.Biró and P.Ván (KFKI RMKI Budapest)
EMMI, Wroclaw, Poland, EU, 10. July 2009. arXiv: 0905.1650
Our statements:
• In the relativistic thermal equilibrium problem between two bodies four velocities are involved for a general observer
• Only one of them can be Lorentz-transformed away; another one equilibrates
• Depending on the factual velocity of heat current all historic answers can be correct for the temperature ratio
• The Planck-Einstein answer is correct for most common bodies (no heat current)
This is not simply about the relativistic Doppler-shift!
• The question is: how do the thermal equilibration looks like between relatively moving bodies at relativistic speeds.
• Is this a Lorentz-scalar problem ?
Some Questions
• What moves (flows)?– baryon, electric, etc. charge ( Eckart : v = 0)– energy-momentum ( Landau : w = 0)
• What is a body?– extended volumes– local expansion factor (Hubble)
• What is the covariant form eos?– functional form of S(E,V,N,…)
• How does T transform?
Relativistic thermodynamics
based on hydrodynamics
• Noether currents Conserved integrals
• Local expansion rate Work on volumes
• E-mom conservation locally First law of thermodynamics globally
• Dissipation, heat, 1/T as integrating factor (Clausius)
• Homogeneous bodies in terms of relativistic hydro
Relativistic energy-momentum
density and currents
ababbaab
b
abab
a
a
a
abbababaab
guupP
0uP,0Pu,0qu
PuqquueuT
Relativistic energy-momentum
conservation
ddaaa
b
bdd
abab
b
a
ababd
dub
b
aadd
b
b
aaaaddab
b
u,u
0uqp
uquuup
uqeuqeuTb
Homogeneity of a body in
volume V
0u,0p,0e
0uu0ub
aaa
a
a
a
a
a
no acceleration of flow locally
no local gradients of energy density and pressure
Integrals over set H() of volume V
aaa
)(H
abba
b)(H
b
b
aaa
qeu
dVqudVu)pu(
volume integrals of internal energy change, work and heat
combined energy-flow four-vector;
energy-current = momentum-density (c=1 units)
Dissipation: energy-momentum
leak through the surface
aaa
H
aaH H
aa
a
Hb
abbaaaa
GuEE,dVqG
eVedVE,dV)x(uV
1u
QdAquVupGuE
relativistic four-vector: heat flow
four-vector: carried + convected (transfer) energy-momentum
l.h.s.: Reynolds’ transport theorem;
r.h.s: Gauss-Ostrogradskij theorem
Entropy and its change
pdVdGdEdS)V,E(SS :e.o.s
ddSAdVupdEQ
bb
aa
bb
ab
b
aa
AA
uAa
AA
A
AA
uA
a
aaaaa
Clausius: integrating factor to heat is
1/T
The integrating factor now is: Aa
Temperature and Gibbs relation
pdVdEgTdS
pdVdGgdETdS
AA
A
T
g,
AA
uA
T
1
a
a
a
a
b
b
aa
b
b
a
a
New intensive parameter: four-vector g
(Jüttner: g is the four-velocity of the body)
Canonical Entropy Maximum
2
2
1
1
2
a
2
1
a
1
2
a
21
a
1
a
2
a
121
T
p
T
p,
T
g
T
g
0)V,E(dS)V,E(dS
0dEdE,0dVdV
Carried and conducted (transfer) energy and
momentum, and volumes add up to constant
The meaning of g
v < 1: velocity of body, w < 1: velocity of heat conduction
ga = ua + wa splitting is general, S=S(Ea,V) suffices!
Jüttner
Spacelike and timelike vectors
1ww
0Tww1gg
0ww0wu,1uu
a
a
22a
a
a
a
a
a
a
a
a
a
v: velocity of body, w: velocity of heat conduction
w 1 means causal heat conduction
One dimensional world
2
2
a
a
w1
Tv1
1
)w,vw(w
)v,(u
v is the velocity of body,
subluminal,
w is the velocity of heat,
subluminal;
Lorentz factor for observer
is related to v
Lorentz factor for temperature
is related to w
One dimensional equilibrium
2
222
1
111
2
222
1
111
T
)wv(
T
)wv(
T
)wv1(
T
)wv1(
Take their ratio; take the difference of their squares!
One dimensional equilibrium
2
2
2
1
2
1
22
22
11
11
T
w1
T
w1
wv1
wv
wv1
wv
The scalar temperatures are equal; T-s depend on the heat transfer!
The transformation of temperatures
2
2
1
2
1221
2211
v1
vw1
T
T
v)v(v)w(w
vwvw
T ratio follows a general Doppler formula with relative velocity v!
Four velocities: v1, v2, w1, w2
Max. one of them can beLorentz-transformed to zero
Cases of apparent temperature
w2 = 0 T1 = T2 / γ
w1 = 0 T1 = T2 γ
w2 = 1, v > 0 T1 = T2 ● red shift
w2 = 1, v < 0 T1 = T2 ● blue shift
w1 + w2 = 0 T1 = T2
Landau frame: w=0, but which w ?
http://demonstrations.wolfram.com/
TransformationsOfRelativisticTemp
eraturePlanckEinsteinOttLan
t
x
u1a
u2a
w1a
w2a
Doppler red-shift
T2 = 2 T1
t
x
u1a
u2a
w1a w2
a = 0
No energy conduction in body 2
T2 = 1.25 T1
t
x
u1a
u2a
w1a = 0
w2a
No energy conduction in body 1
T2 = 0.8 T1
t
x
u1a
u2a
w1a
w2a
Energy conductions in bodies 1 and 2 compensate each other
T2 = T1
t
x
u1a
u2a
w1a
w2a
Doppler blue-shift
T2 = 0.5 T1
Our statements:
• In the relativistic thermal equilibrium problem between two bodies four velocities are involved for a general observer
• Only one of them can be Lorentz-transformed away; another one equilibrates
• Depending on the factual velocity of heat current all historic answers can be correct for the temperature ratio
• The Planck-Einstein answer is correct for most common bodies (no heat current)
Summary and Outlook• S = S(E,V,N)• E exchg. in move• cooler, hotter, equal• Doppler shift• relative velocity v
equilibrates to zero
• S = S(Ea,V,N)• ga / T equilibrates• ga = ua + wa
• S = S( ||E||, V, N)• T and w do not
equilibrate and w v equilibrate• T: transformation
dopplers w by v rel.• New Israel-Stewart
expansion, better stability in dissipative hydro, cools correct
Biro, Molnar, Van: PRC 78, 014909, 2008