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Transcript
Asymptotic Equivalence of KMS States in Rindler
spacetime
Maximilian Kähler
Institute of Theoretical Physics
Leipzig University
LQP workshop, 29-30 May, 2015
Introduction - The Unruh effect
"An accelerated observer perceives an ambient inertial vacuum as a state of
thermal equilibrium."
[Fulling-Davies-Unruh 1973-1976]
Modern formulation in mathematical physics:
The Minkowski vacuum restricted to the Rindler spacetime is a KMS
state with real parameter1
βUnruh =
2π
.
g
Can 1/βUnruh be interpreted as a local temperature?
1
natural units c = ~ = kB = 1
2 / 17
Outline
1
KMS Condition and Previous Results
2
Main Result
3
Proof of Main Result (Sketch)
3 / 17
References
D. Buchholz, C. Solveen
Unruh Effect and the Concept of Temperature
Class. Quantum Grav. 30(8):085011, Mar 2013
arXiv:1212.2409
D. Buchholz, R. Verch
Macroscopic aspects of the Unruh Effect
arXiv:1412.5892, Dec 2014
M. Kähler
On Quasi-equivalence of Quasi-free KMS States restricted to an
unbounded Subregion of the Rindler Spacetime
http://lips.informatik.uni-leipzig.de/pub/2015
Diploma Thesis, Jan 2015
4 / 17
KMS states
Let (A, αt ) be a C*-algebraic dynamical system.
Definition
A state ω on A is called a β-KMS state for β > 0, if for all A, B ∈ A there exists
a bounded continuous function
FA,B : Sβ := R × i[0, β] −→ C,
holomorphic in the interior of Sβ , such that for all t ∈ R
FA,B (t) = ω(Aαt (B)),
FA,B (t + iβ) = ω(αt (B)A).
5 / 17
Recent doubts on the thermal interpretation of βUnruh
Buchholz-Solveen 03/2013:
Two distinct definitions of temperature in classical thermodynamics:
A) empirical temperature scale based on zeroth law,
B) absolute temperature scale based on second law ("Carnot Parameter").
Observation
One-to-one correspondence of these definitions does only hold in inertial
situations.
Review of temperature definitions in an algebraic framework,
KMS-parameter corresponds to the second law definition,
⇒ KMS-parameter loses interpretation of inverse temperature in
non-inertial situations.
6 / 17
Recent doubts on local thermal interpretation of βUnruh
Example: comparison of KMS states in Minkowski and Rindler space
Buchholz and Solveen exhibit a empirical temperature observable θy for
every y ∈ M
Minkowski Spacetime M
ωβM (θy ) = C β1
spatially homogeneous
Rindler Spacetime
R C
1
1
ωβR (θy ) = x (y )2 β 2 − (2π)
2
spatial temperature gradient
7 / 17
Far away all KMS states look the same
Buchholz-Verch 12/2014:
Let O ⊂ R be a causally complete bounded subset,
Let x (s) = (0, s, 0, 0) ∈ R4 , s > 0, be a family of 4-vectors,
Consider the translates O + x (s) and the corresponding local field
algebra A(O + x (s)) of a massless scalar field.
8 / 17
Far away all KMS states look the same
Buchholz-Verch 12/2014:
Let O ⊂ R be a causally complete bounded subset,
Let x (s) = (0, s, 0, 0) ∈ R4 , s > 0, be a family of 4-vectors,
Consider the translates O + x (s) and the corresponding local field
algebra A(O + x (s)) of a massless scalar field.
Then for all β1 , β2 > 0
lim ωβ1 − ωβ2 |A(O+x (s)) = 0.
s→∞
spatial inhomogeneity is independent of chosen observable
8 / 17
Main Result
Local quasi-equivalence of quasi-free KMS states
Theorem
Let A be the Weyl algebra of the real massive Klein-Gordon field on
the Rindler spacetime.
Let A(B) be the local subalgebra corresponding to the causal
completion of the unbounded region
n
o
B := (0, y1 , ξ) ∈ R1,3 | y1 > X0 , kξk < R ,
with R > 0, X0 > 0.
For β > 0 denote by ωβ the unique quasi-free β-KMS states on A with
non-degenerate β-KMS one-particle structure.
⇒ Then for all 0 < β1 < β2 ≤ ∞ the states ωβ1 |A(B) and ωβ2 |A(B) are
quasi-equivalent.
9 / 17
Main Result
Local quasi-equivalence of quasi-free KMS states
Theorem
Let A be the Weyl algebra of the real massive Klein-Gordon field on
the Rindler spacetime.
Let A(B) be the local subalgebra corresponding to the causal
completion of the unbounded region
n
o
B := (0, y1 , ξ) ∈ R1,3 | y1 > X0 , kξk < R ,
with R > 0, X0 > 0.
For β > 0 denote by ωβ the unique quasi-free β-KMS states on A with
non-degenerate β-KMS one-particle structure.
⇒ Then for all 0 < β1 < β2 ≤ ∞ the states ωβ1 |A(B) and ωβ2 |A(B) are
quasi-equivalent.
9 / 17
Restricted Spacetime Region in Rindler spacetime
R := {(y0 , y1 , y2 , y3 ) ∈ R1,3 | |y0 | < y1 }
10 / 17
Restricted Spacetime Region in Rindler spacetime
R := {(y0 , y1 , y2 , y3 ) ∈ R1,3 | |y0 | < y1 }
10 / 17
Restricted Spacetime Region in Rindler spacetime
n
B := (0, y1 , ξ) ∈ R1,3 | y1 > X0 , kξk < R
o
10 / 17
Main Result
Local quasi-equivalence of quasi-free KMS states
Theorem
Let A be the Weyl algebra of the real massive Klein-Gordon field on
the Rindler spacetime.
Let A(B) be the local subalgebra corresponding to the causal
completion of the unbounded region
n
o
B := (0, y1 , ξ) ∈ R1,3 | y1 > X0 , kξk < R ,
with R > 0, X0 > 0.
For β > 0 denote by ωβ the unique quasi-free β-KMS states on A with
non-degenerate β-KMS one-particle structure.
⇒ Then for all 0 < β1 < β2 ≤ ∞ the states ωβ1 |A(B) and ωβ2 |A(B) are
quasi-equivalent.
11 / 17
Proof
Description of Quasi-free States
Classical Klein-Gordon field can be described by a real symplectic space
(S, σ).
Let µ : S × S → R be a real inner product on (S, σ), such that
|σ(Φ1 , Φ2 )| ≤ 2µ(Φ1 , Φ1 )1/2 · µ(Φ2 , Φ2 )1/2 .
Then
1
ωµ (W (Φ)) := exp − µ(Φ, Φ)
2
defines a state on A. ωµ is called a quasi-free state.
12 / 17
Sufficient Criterion for Quasi-equivalence
Theorem (Araki-Yamagami 1982; Verch 1992)
Let ω1 , ω2 be quasi-free states on the Weyl-Algebra A, uniquely
characterised by real inner products µ1 , µ2 : S × S → R. Consider the
C
C
complexification S C := S ⊕ iS and the sesquilinear extensions µC
1 , µ2 to S .
Then ω1 , ω2 are quasi-equivalent if the following two conditions hold
C
C
i) µC
1 , µ2 induce equivalent norms on S
ii) The operator T : S C → S C defined through
C
C
µC
1 (Φ1 , Φ2 ) − µ2 (Φ1 , Φ2 ) = µ1 (Φ1 , T Φ2 ),
for all Φ1 , Φ2 ∈ S C , is of trace class in (S C , µC
1 ).
13 / 17
Defining Inner Products
Inner product for quasi-free β-KMS states:
µβ (Φ1 , Φ2 ) =
1
2
f1 , A
1/2
coth
A1/2 β
2
f2
+
−1/2
p1 , A
coth
L2 (R3 )
A1/2 β
2
!
p2
,
L2 (R3 )
for Φj = (fj , pj ) ∈ S := C0∞ (R3 ) × C0∞ (R3 ), j = 1, 2.
Involves the partial differential operator A
A = −∂x21 + e 2x1 (m2 − ∂x22 − ∂x23 ),
positive and essentially self-adjoint on C0∞ (R3 ) ⊂ L2 (R3 ).
Norm equivalence can be easily asserted.
14 / 17
Proving trace class property
Kontorovich-Lebedev transform: special integral transform U
provides explicit spectral representation of operator A
Integral operator: U used to rewrite T 1/2 as integral operator on
weighted L2 spaces
I := U −1 T 1/2 U : L2 (M, dνβ1 ) → L2 (M, dνβ1 ),
Z
(Iφ)(m) =
M
K (m, m0 )φ(m0 )dνβ1 (m0 )
Hilbert-Schmidt Theorem:
T 1/2 is Hilbert-Schmidt class ⇔ K ∈ L2 (M × M, dνβ1 ⊗ dνβ1 )
15 / 17
Summary
Three levels of content:
A) Conceptual level:
Interpretation of Unruh effect requires careful application of
thermodynamic concepts,
1/β need not be a meaningful temperature scale.
B) Abstract quasi-equivalence result:
first result to establish local quasi-equivalence on unbounded subregion
"Accelerated" KMS states coincide at large distance.
C) Specific functional analytic techniques:
Explicit spectral calculations,
Analysis of integral operators.
16 / 17
References
D. Buchholz, C. Solveen
Unruh Effect and the Concept of Temperature
Class. Quantum Grav. 30(8):085011, Mar 2013
arXiv:1212.2409
D. Buchholz, R. Verch
Macroscopic aspects of the Unruh Effect
arXiv:1412.5892, Dec 2014
M. Kähler
On Quasi-equivalence of Quasi-free KMS States restricted to an
unbounded Subregion of the Rindler Spacetime
http://lips.informatik.uni-leipzig.de/pub/2015
Diploma Thesis, Jan 2015
17 / 17
Construction of the operator T
Use the Riesz-lemma to define the operator T : S → S by
µβ1 (Φ1 , Φ2 ) − µβ2 (Φ1 , Φ2 ) = µβ1 (Φ1 , T Φ2 )
for all Φ1 , Φ2 ∈ S.
As a matrix acting on f - and p-components of S
T =
with
sβ1 ,β2 (A1/2 )
0
0
sβ1 ,β2 (A1/2 )
sβ1 ,β2 (τ ) := 1 −
coth (β2 τ /2)
coth (β1 τ /2)
!
,
18 / 17
Intuition for the operator T
coth (β2 τ /2)
sβ1 ,β2 (τ ) := 1 −
coth (β1 τ /2)
19 / 17
Previous result on local quasi-equivalence
Theorem (Verch, CMP 160)
Let ω1 and ω2 be two quasi-free Hadamard states on the Weyl algebra A of
the Klein-Gordon field in some globally hyperbolic spacetime (M, g), and let
π1 and π2 be their associated GNS representations. Then π1 |A(O) and
π2 |A(O) are quasi-equivalent for every open subset O ⊂ M with compact
closure.
20 / 17