4 Applications 481Suppose further that there exists aninvariant region X⊆Rd.Thatis,Xis the
closure of a bounded connected open set andx ∈ Ximpliesφt(x)∈X. Then the
mapTt:X → Xgiven byTtx =φt(x)is defined for everyt ∈ Rand satisfies
Tt+sx=Tt(Tsx).
Suppose finally that divf = 0foreveryx ∈ Rd,wherex =(x 1 ,...,xd),
f=(f 1 ,...,fd)and
divf:=∑dk= 1∂fk/∂xk.Then, by a theorem due to Liouville, the mapTtsends an arbitrary region into a region
of the same volume. (For the statement and proof of Liouville’s theorem see, for exam-
ple, V.I. Arnold,Mathematical methods of classical mechanics, Springer-Verlag, New
York, 1978.) It follows that ifBis the family of Borel subsets ofXandμLebesgue
measure, normalized so thatμ(X)=1, thenTtis a measure-preserving transformation
of the probability space (X,B,μ).
An important special case is the Hamiltonian system of ordinary differential equa-
tions
dpi/dt=−∂H/∂qi, dqi/dt=∂H/∂pi (i= 1 ,...,n),whereH(p 1 ,...,pn,q 1 ,...,qn)is a twice continuously differentiable real-valued
function. The divergence does indeed vanish identically in this case, since
−
∑ni= 1∂^2 H/∂pi∂qi+∑ni= 1∂^2 H/∂qi∂pi= 0.Furthermore, for anyh∈R, the energy surfaceX:H(p,q)=his invariant, since
dH[p(t),q(t)]/dt=∑ni= 1∂H/∂pi(−∂H/∂qi)+∑ni= 1∂H/∂qi∂H/∂pi= 0.It is not difficult to show that ifσis the volume element onXinduced by the Euclidean
metric‖‖onR^2 n,andif
∇H=(∂H/∂p 1 ,...,∂H/∂pn,∂H/∂q 1 ,...,∂H/∂qn)is the gradient ofH, then the mapsTtpreserve the measureμonXdefined by
μ(B)=∫
Bdσ/‖∇H‖.IfXis compact, this measure can be normalized and we obtain a family of measure-
preserving transformationsTt(t∈R)of the corresponding probability space.
(vi) Many problems arising in mechanics may be reduced by a change of variables to
the geometric problem ofgeodesic flow.IfMis a smooth Riemannian manifold then
the set of all pairs (x,v), wherex∈Mandvis a unit vector in the tangent space to