Problems 73T
S
Fig. 2.5Thermodynamic cycle.a. Find a solution of the Liouville equation that also satisfies this initial
distribution.Hint: Show that the substitutionf(x,t) = eαtf ̃(x,t) yields an equation
for a conserved distributionf ̃(x,t). Next, try multiplying thex^2 in the
initial distribution by an arbitrary functiong(t) that must satisfyg(0) =- Use the Liouville equation to derive an equation thatg(t) must satisfy
and then solve this equation.
b. Describe the evolution of the ensemble distribution qualitatively and ex-
plain why it should evolve this way.c. Show that your solution is properly normalized in the sense that∫∞−∞dxf(x,t) = 1.∗2.6. An alternative definition of entropy was proposed by Gibbs, whoexpressed
the entropy in terms of the phase space distribution functionf(x,t) asS(t) =−k∫
dxf(x,t) lnf(x,t).