TOPICS
Search

KMS Condition


The Kubo-Martin-Schwinger (KMS) condition is a kind of boundary-value condition which naturally emerges in quantum statistical mechanics and related areas.

Given a quantum system B=B(H) with finite dimensional Hilbert space H, define the function tau^t as

 tau^t(A)=e^(itH)Ae^(-itH),
(1)

where i=sqrt(-1) is the imaginary unit and where H=H^* is the Hamiltonian, i.e., the sum of the kinetic energies of all the particles in B plus the potential energy of the particles associated with B. Next, for any real number beta in R, define the thermal equilibrium omega_beta as

 omega_beta(A)=(Tr(e^(-betaH)A))/(Tr(e^(-betaH))),
(2)

where Tr denotes the matrix trace. From tau^t and omega_beta, one can define the so-called equilibrium correlation function F=F_beta where

 F_beta(A,B;t)=omega_beta(Atau^t(B)),
(3)

whereby the KMS boundary condition says that

 F_beta(A,B;t+ibeta)=omega_beta(tau^t(beta)A).
(4)

In particular, this identity relates to the state omega_beta the values of the analytic function F_beta(A,B;z) on the boundary of the strip

 S_beta={z in C:0<I(zsgn(beta))<|beta|},
(5)

where here, I(w) denotes the imaginary part of w in C and sgn(x) denotes the signum function applied to x in R.

In various literature, the KMS boundary condition is stated in sometimes-different contexts. For example, the identity () is sometimes written with respect to integration, yielding

 int_(-infty)^inftyomega_beta(Atau^t(B))f(t-ibeta)dt=int_(-infty)^inftyomega_beta(tau^t(B)A)f(t)dt,
(6)

where here, f(z) is used as shorthand for F_beta(A,B;z). In other literature (e.g., Araki and Miyata 1968), the condition looks different still.


See also

Bounded Operator, Hilbert Space, Linear Operator, Tomita-Takesaki Theory

This entry contributed by Christopher Stover

Explore with Wolfram|Alpha

References

Araki, H. and Miyata, H. "On KMS Boundary Condition." Publ. RIMS, Kyoto Univ. Ser. A 4, 373-385, 1968.Cohen, J. S.; Daniëls, H. A. M.; and Winnink, M. "On Generalizations of the KMS-Boundary Condition." Commun. Math. Phys. 84, 449-458, 1982.Derezński, J. and Pillet, C. "KMS States." http://pillet.univ-tln.fr/data/pdf/KMS-states.pdf.Nave, C. R. "The Hamiltonian in Quantum Mechanics." HyperPhysics. 2012. http://hyperphysics.phy-astr.gsu.edu/hbase/quantum/hamil.html.

Cite this as:

Stover, Christopher. "KMS Condition." From MathWorld--A Wolfram Web Resource, created by Eric W. Weisstein. https://mathworld.wolfram.com/KMSCondition.html

Subject classifications