16.2.1 Ensemble averages of expectation values in mixtures
In a pure normalized state|ψ〉, we defined theexpectation value of an observableAby the matrix
element〈ψ|A|ψ〉= Tr
(
A|ψ〉〈ψ|)
, a quantity that gives the quantum mechanical weighed probability
average of the eigenvalues ofA.
In a mixed state, these quantum mechanical expectation values must be further weighed by
the population fraction of each pure state in the mixture. One defines theensemble averageof the
observableAby
Tr(ρA) =∑
iTr(
A|ψi〉wi〈ψi|)=
∑iwi〈ψi|A|ψi〉 (16.10)It follows from the properties of the density operator that the ensemble average of any self-adjoint
operator is real.
16.2.2 Time evolution of the density operator
Any quantum state|ψ(t)〉in the Schr ̈odinger picture evolves in time under the Schr ̈odinger equation,
i ̄h
d
dt|ψ(t)〉=H|ψ(t)〉 (16.11)Assuming that the population fractionswiandpido not change in time during this evolution, the
density operatorρ(t) then obeys the following time evolution equation,
i ̄h
d
dt
ρ(t) = [H,ρ(t)] (16.12)To prove this formula, one first derives the time evolution equation for|ψ(t)〉〈ψ(t)|and then takes
the weighed average with the time-indepenent population fractions. This time evolution may be
solved for in terms of the unitary evolution operatorU(t) =e−itH/ ̄h, by
ρ(t) =U(t)ρ(0)U(t)† (16.13)Notice that the normalization condition Tr(ρ) = 1 is automatically preserved under time evolution.
16.3 Example of the two-state system
Consider the two-state system of a spin 1/2, expressed in theeigenbasis ofSz, given by the states
|z+〉and|z−〉. Below are three examples of the density matrix evaluated for pure states.
- Polarized along theSzdirection with eigenvalue + ̄h/2, the state is|z+〉, and the correspond-
ing density operator isρ=|z+〉〈z+|. The ensemble averages are tr(ρSx) = tr(ρSy) = 0,
and tr(ρSz) = + ̄h/2.