The time-dependent Schr ̈odinger equation for|ψ(t)〉then reduces to the following set of equations
fora±,
ia ̇+(t) =
ω 0
2a+(t) +
ω 1
2e−iωta−(t)ia ̇−(t) =
ω 1
2
e+iωta+(t)−
ω 0
2
a−(t) (13.6)In a comoving frame of states, defined by
b+(t) = a+(t)e+iωt/^2
b−(t) = a−(t)e−iωt/^2 (13.7)the equations simplify in that they no longer involve any explicit time dependence,
i ̇b+(t) =
ω 0 −ω
2
b+(t) +
ω 1
2
b−(t)i ̇b−(t) =
ω 1
2b+(t)−
ω 0 −ω
2b−(t) (13.8)The time evolution of theb±variables is thus effectively given by a reduced Hamiltonian,
H ̃= ̄h
2(
ω 0 −ω ω 1
ω 1 −ω 0 +ω)
(13.9)The eigenvalues ofH ̃ are± ̄hΩ with
Ω =√
(ω 0 −ω)^2 +ω 12 (13.10)Thus, we get the following general solution,
(
b+(t)
b−(t)
)
=γ+(
ω 1
Ω +ω−ω 0)
e−iΩt/^2 +γ−(
ω 1
−Ω +ω−ω 0)
e+iΩt/^2 (13.11)whereγ±are constants. This gives a complete solution of the problem.
We now introduce also physical initial conditions and a physical problem : suppose the system
at timet= 0 is in the state|+〉, what is the probability of finding the system in the state|−〉after
timet? To solve this problem, we first enforce the initial condition on the general solution. This
means that at timet= 0, we havea+(0) =b+(0) = 1 anda−(0) =b−(0) = 0, so that we must have
γ±=1
2 ω 1(
1 ±
ω 0 −ω
Ω)
(13.12)The desired probability is then given by
P+−(t) =
ω^21
(ω−ω 0 )^2 +ω^21sin^2(√
(ω−ω 0 )^2 +ω^21
t
2)
(13.13)This is the Rabi formula for magnetic resonance. The resonance effect occurs whenω∼ω 0 , in
which case the probability for the spin flip is maximal. In fact, whenω=ω 0 , then this formula
tells us that after a timet=π/ω 1 , the spin is flipped with probability 1.