KMS state


In the statistical mechanics of quantum mechanical systems and quantum field theory, the properties of a system in thermal equilibrium can be described by a mathematical object called a Kubo–Martin–Schwinger state or, more commonly, a KMS state: a state satisfying the KMS condition. introduced the condition, used it to define thermodynamic Green's functions, and
used the condition to define equilibrium states and called it the KMS condition.

Overview

The simplest case to study is that of a finite-dimensional Hilbert space, in which one does not encounter complications like phase transitions or spontaneous symmetry breaking. The density matrix of a thermal state is given by
where H is the Hamiltonian operator and N is the particle number operator and
is the partition function. We assume that N commutes with H, or in other words, that particle number is conserved.
In the Heisenberg picture, the density matrix does not change with time, but the operators are time-dependent. In particular, translating an operator A by τ into the future gives the operator
A combination of time translation with an internal symmetry "rotation" gives the more general
A bit of algebraic manipulation shows that the expected values
for any two operators A and B and any real τ. We used the fact that the density matrix commutes with any function of and that the trace is cyclic.
As hinted at earlier, with infinite dimensional Hilbert spaces, we run into a lot of problems like phase transitions, spontaneous symmetry breaking, operators that are not trace class, divergent partition functions, etc..
The complex functions of z, converges in the complex strip whereas converges in the complex strip if we make certain technical assumptions like the spectrum of H − μN is bounded from below and its density does not increase exponentially. If the functions converge, then they have to be analytic within the strip they are defined over as their derivatives,
and
exist.
However, we can still define a KMS state as any state satisfying
with and being analytic functions of z within their domain strips.
and are the boundary distribution values of the analytic functions in question.
This gives the right large volume, large particle number thermodynamic limit. If there is a phase transition or spontaneous symmetry breaking, the KMS state is not unique.
The density matrix of a KMS state is related to unitary transformations involving time translations via the Tomita–Takesaki theory.