574 Langevin and generalized Langevin equations
equivalent toV(q), the term in brackets represents the interaction between the system
and the bath, and the final term is a pure bath–bath interaction.
Suppose the bath potentialUbathcan be reasonably approximated by an expan-
sion up to second order about a minimum characterized by values ̄q,y ̄ 1 ,..., ̄ynof the
generalized coordinates. The condition forUbathto have a minimum at these values is
∂Ubath
∂qα∣
∣
∣
∣
{q= ̄q,y= ̄y}= 0, (15.1.7)
where all coordinates are set equal to their values at the minimum. Performing the
expansion up to second order gives
Ubath(q,y 1 ,...,yn)≈Ubath( ̄q,y ̄ 1 ,...,y ̄n) +∑
α∂Ubath
∂qα∣
∣
∣
∣
{q= ̄q,y= ̄y}(qα−q ̄α)+
1
2
∑
α,β(qα−q ̄α)[
∂^2 Ubath
∂qα∂qβ∣
∣
∣
∣
{q= ̄q,y= ̄y}]
(qβ−q ̄β). (15.1.8)The second term in eqn. (15.1.8) vanishes by virtue of the condition ineqn. (15.1.7).
The first term is a constant that can be made to vanish by shifting the absolute zero
of the potential (which is, anyway, arbitrary). Thus, the bath potential reduces, in this
approximation, to
Ubath(q,y 1 ,...,yn) =1
2
n∑+1α=1n∑+1β=1q ̃αHαβq ̃β, (15.1.9)whereHαβ=∂^2 Ubath/∂qα∂qβ|q= ̄q,{y= ̄y}and ̃qα=qα− ̄qαare the displacements of
the generalized coordinates from their values at the minimum of the potential. Note
that since we have already identified the purelyq-dependent term in eqn. (15.1.6),
theH 11 arising from the expansion of the bath potential can be taken to bezero or
absorbed into theq-dependent functionV(q). Since our treatment from this point on
will refer to the displacement coordinates, we will drop the tildes andletqαrefer to the
displacement of a coordinate from its value at the minimum. Separating the particular
coordinateqfrom the other coordinates gives a potential of the form
Ubath(q,y 1 ,...,yn) =∑
αCαqyα+1
2
∑nα=1∑nβ=1yαH ̃αβyβ, (15.1.10)whereCα =H 1 α =Hα 1 andH ̃αβis the n×nblock ofHαβ coupling only the
coordinatesy 1 ,...,yn. The potential, though quadratic, is still somewhat complicated
because all of the coordinates are coupled through the matrixHαβ. Thus, in order to
simplify the potential, we introduce a linear transformation of the coordinatesy 1 ,...,yn
tox 1 ,...,xnvia
yα=∑nβ=1Rαβxβ, (15.1.11)