608 Langevin and generalized Langevin equations
15.9. a. Derive eqns. (15.7.27), (15.7.30), and (15.7.31).
∗b. Derive eqn. (15.7.34).∗15.10. A solution contains a very low concentration of solute molecules (denoted A)
and solvent molecules (denoted B). Let the number of solute molecules be
NAwith positionsr 1 (t),...,rNA(t). We can introduce a phase space function
for the solute concentrationc(r,t) at any pointrin space asc(r,t) =∑NA
i=1δ(r−ri(t)).a. Assuming the solution is in a cubic periodic box of lengthL, show that
the spatial Fourier transform ̃ck(t) ofc(r,t) is̃ck(t) =∑NA
i=1e−ik·ri(t),wherek= 2πn/L, wherenis a vector of integers.b. Use the Mori–Zwanzig theory to derive a generalized Langevin equation
for ̃ck(t) and give the explicit expressions for all terms in the equation.c. Now consider the correlation functionC(k,t) =
〈 ̃c−k(0) ̃ck(t)〉
〈 ̃c−k ̃ck〉.
Starting with your generalized Langevin equation of part b, derive an
integro-differential equation satisfied byC(k,t).d. Show that the memory kernel in your equation is at least second order in
the wave vectork.e. Show that exp(QiLt)→exp(iLt) as|k|→∞.f. Suppose the memory kernel decays rapidly in time. In this limit, show
that the correlation function satisfies an equation of the form∂
∂t
C(k,t) =−k·D·kC(k,t),whereDis the diffusion tensor. Give an expression forDin terms of a
velocity autocorrelation function.