407 lines
No EOL
18 KiB
Text
407 lines
No EOL
18 KiB
Text
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§48
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Separation of the variables
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151
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To make the variables separable in the Hamilton-Jacobi equation the
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co-ordinates must be appropriately chosen. We shall consider some examples
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of separating the variables in different co-ordinates, which may be of
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physical interest in connection with problems of the motion of a particle in
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various external fields.
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(1) Spherical co-ordinates. In these co-ordinates (r, 0, ), the Hamiltonian is
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and the variables can be separated if
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U
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=
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where a(r), b(a), c(b) are arbitrary functions. The last term in this expression
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for U is unlikely to be of physical interest, and we shall therefore take
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U = a(r)+b(8)/r2.
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(48.8)
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In this case the Hamilton-Jacobi equation for the function So is
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1
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Since the co-ordinate is cyclic, we seek a solution in the form So
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Pot+S1(T)+S2(9), obtaining for the functions S1(r) andS 2(0) the equations
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(day)
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=
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E.
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Integration gives finally
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S = -
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(48.9)
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The arbitrary constants in (48.9) are Pp, B and E; on differentiating with
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respect to these and equating the results to other constants, we have the
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general solution of the equations of motion.
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(2) Parabolic co-ordinates. The passage from cylindrical co-ordinates
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(here denoted by p, o, 2) to parabolic co-ordinates E, N, o is effected by the
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formulae
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1(-n),pv(En).
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(48.10)
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The co-ordinates & and n take values from 0 to 00; the surfaces of constant
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$ and n are easily seen to be two families of paraboloids of revolution, with
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152
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The Canonical Equations
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§48
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the z-axis as the axis of symmetry. The equations (48.10) can also be written,
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in terms of
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r = =
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(48.11)
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(i.e. the radius in spherical co-ordinates), as
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$ = r++,
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= r Z.
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(48.12)
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Let us now derive the Lagrangian of a particle in the co-ordinates $, n, o.
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Differentiating the expressions (48.10) with respect to time and substituting
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in the Lagrangian in cylindrical co-ordinates
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L =
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we obtain
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L
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=
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(48.13)
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The = and
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the Hamiltonian is
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(48.14)
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The physically interesting cases of separable variables in these co-ordinates
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correspond to a potential energy of the form
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(48.15)
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The equation for So is
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2
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=
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E.
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The cyclic co-ordinate can be separated as a term PoO. Multiplying the equa-
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tion by m(s+n) and rearranging, we then have
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Putting So = P&O + S2(n), we obtain the two equations
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-B,
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§48
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Separation of the variables
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153
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integration of which gives finally
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S
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=
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dn.
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(48.16)
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Here the arbitrary constants are Ps, B and E.
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(3) Elliptic co-ordinates. These are E, n, o, defined by
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(48.17)
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The constant o is a parameter of the transformation. The co-ordinate $ takes
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values from 1 to 80, and n from - 1 to + 1. The definitions which are geo-
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metrically clearest+ are obtained in terms of the distances r1 and r2 to points
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A1 and A2 on the z-axis for which 2 = to: r1 = V[(2-0)2+p2],
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r2 = Substitution of (48.17) gives
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= o(s-n), r2 = o(+n),
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(48.18)
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& = (r2+r1)/2o, n = (r2-r1)/2o. =
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Transforming the Lagrangian from cylindrical to elliptic co-ordinates, we
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find
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L
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=
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(48.19)
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The Hamiltonian is therefore
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H
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=
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(48.20)
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The physically interesting cases of separable variables correspond to a
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potential energy
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(48.21)
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where a() and b(n) are arbitrary functions. The result of separating the
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variables in the Hamilton-Jacobi equation is
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S
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=
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1-n2
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t The surfaces of constant $ are the ellipsoids = 1, of which A1 and
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A2 are the foci; the surfaces of constant n are the hyperboloids 22/02/2-22/02(1-n2 = 1,
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also with foci A1 and A2.
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154
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The Canonical Equations
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§49
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PROBLEMS
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PROBLEM 1. Find a complete integral of the Hamilton-Jacobi equation for motion of a
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particle in a field U = a/r-Fz (a combination of a uniform field and a Coulomb field).
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SOLUTION. The field is of the type (48.15), with a(f)=a1F,b(n)a+Fn2 Formula
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(48.16) gives
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S
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=
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with arbitrary constants Po, E,B. The constant B has in this case the significance that the one-
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valued function of the co-ordinates and momenta of the particle
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B
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is conserved. The expression in the brackets is an integral of the motion for a pure Coulomb
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field (see $15).
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PROBLEM 2. The same as Problem 1, but for a field U = ai/r +az/r2 (the Coulomb field
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of two fixed points at a distance 2a apart).
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SOLUTION. This field is of the type (48.21), with a($) = (a1+az) /o, = (a1-az)n/o.
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From formula (48.22) we find
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S
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=
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The constant B here expresses the conservation of the quantity
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B = cos 01+ cos 02),
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where M is the total angular momentum of the particle, and 01 and O2 are the angles shown in
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Fig. 55.
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12
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r
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The
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20
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a
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FIG. 55
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$49. Adiabatic invariants
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Let us consider a mechanical system executing a finite motion in one dimen-
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sion and characterised by some parameter A which specifies the properties of
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the system or of the external field in which it is placed, and let us suppose that
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1 varies slowly (adiabatically) with time as the result of some external action;
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by a "slow" variation we mean one in which A varies only slightly during the
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period T of the motion:
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di/dt < A.
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(49.1)
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§49
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Adiabatic invariants
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155
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Such a system is not closed, and its energy E is not conserved. However, since
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A varies only slowly, the rate of change E of the energy is proportional to the
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rate of change 1 of the parameter. This means that the energy of the system
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behaves as some function of A when the latter varies. In other words, there
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is some combination of E and A which remains constant during the motion.
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This quantity is called an adiabatic invariant.
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Let H(p, q; A) be the Hamiltonian of the system, which depends on the
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parameter A. According to formula (40.5), the total time derivative of the
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energy of the system is dE/dt = OH/dt = (aH/dx)(d)/dt). In averaging this
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equation over the period of the motion, we need not average the second
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factor, since A (and therefore i) varies only slowly: dE/dt = (d)/dt)
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and in the averaged function 01/01 we can regard only P and q, and not A, as
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variable. That is, the averaging is taken over the motion which would occur
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if A remained constant.
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The averaging may be explicitly written
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dE dt
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According to Hamilton's equation q = OHOP, or dt = dq - (CH/OP). The
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integration with respect to time can therefore be replaced by one with respect
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to the co-ordinate, with the period T written as
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here the $ sign denotes an integration over the complete range of variation
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("there and back") of the co-ordinate during the period. Thus
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dq/(HHap)
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(49.2)
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dt $ dq/(HHdp)
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As has already been mentioned, the integrations in this formula must be
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taken over the path for a given constant value of A. Along such a path the
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Hamiltonian has a constant value E, and the momentum is a definite function
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of the variable co-ordinate q and of the two independent constant parameters
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E and A. Putting therefore P = p(q; E, 1) and differentiating with respect
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to A the equation H(p, q; X) )=E, we have = 0, or
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OH/OP ax ap
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t If the motion of the system is a rotation, and the co-ordinate q is an angle of rotation ,
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the integration with respect to must be taken over a "complete rotation", i.e. from 0 to 2nr.
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156
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The Canonical Equations
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§49
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Substituting this in the numerator of (49.2) and writing the integrand in the
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denominator as ap/dE, we obtain
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dt
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(49.3)
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dq
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or
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dt
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Finally, this may be written as
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dI/dt 0,
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(49.4)
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where
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(49.5)
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the integral being taken over the path for given E and A. This shows that, in
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the approximation here considered, I remains constant when the parameter A
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varies, i.e. I is an adiabatic invariant.
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The quantity I is a function of the energy of the system (and of the para-
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meter A). The partial derivative with respect to energy is given by 2m DI/DE
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= $ (ap/dE) dq (i.e. the integral in the denominator in (49.3)) and is, apart from
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a factor 2n, the period of the motion:
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(49.6)
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The integral (49.5) has a geometrical significance in terms of the phase
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path of the system. In the case considered (one degree of freedom), the phase
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space reduces to a two-dimensional space (i.e. a plane) with co-ordinates
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P, q, and the phase path of a system executing a periodic motion is a closed
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curve in the plane. The integral (49.5) taken round this curve is the area
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enclosed. It can evidently be written equally well as the line integral
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I = - $ q dp/2m and as the area integral I = II dp dq/2m.
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As an example, let us determine the adiabatic invariant for a one-dimen-
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sional oscillator. The Hamiltonian is H = where w is the
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frequency of the oscillator. The equation of the phase path is given by the
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law of conservation of energy H(p, q) = E. The path is an ellipse with semi-
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axes (2mE) and V(2E/mw2), and its area, divided by 2nr, is
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I=E/w.
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(49.7)
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t It can be shown that, if the function X(t) has no singularities, the difference of I from a
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constant value is exponentially small.
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§49
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Adiabatic invariants
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157
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The adiabatic invariance of I signifies that, when the parameters of the
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oscillator vary slowly, the energy is proportional to the frequency.
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The equations of motion of a closed system with constant parameters
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may be reformulated in terms of I. Let us effect a canonical transformation
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of the variables P and q, taking I as the new "momentum". The generating
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function is the abbreviated action So, expressed as a function of q and I. For
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So is defined for a given energy of the system; in a closed system, I is a func-
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tion of the energy alone, and so So can equally well be written as a function
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So(q, I). The partial derivative (So/dq)E is the same as the derivative
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( for constant I. Hence
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(49.8)
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corresponding to the first of the formulae (45.8) for a canonical trans-
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formation. The second of these formulae gives the new "co-ordinate",
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which we denote by W:
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W = aso(q,I)/aI.
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(49.9)
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The variables I and W are called canonical variables; I is called the action
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variable and W the angle variable.
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Since the generating function So(q, I) does not depend explicitly on time,
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the new Hamiltonian H' is just H expressed in terms of the new variables.
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In other words, H' is the energy E(I), expressed as a function of the action
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variable. Accordingly, Hamilton's equations in canonical variables are
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i = 0,
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w = dE(I)/dI.
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(49.10)
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The first of these shows that I is constant, as it should be; the energy is
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constant, and I is so too. From the second equation we see that the angle
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variable is a linear function of time:
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W = (dE/dI)t + constant.
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(49.11)
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The action So(q, I) is a many-valued function of the co-ordinate. During
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each period this function increases by
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(49.12)
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as is evident from the formula So = Spdq and the definition (49.5). During
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the same time the angle variable therefore increases by
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Aw = (S/I) =
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(49.13)
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t The exactness with which the adiabatic invariant (49.7) is conserved can be determined by
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establishing the relation between the coefficients C in the asymptotic (t + 00) expressions
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q = re[c exp(iw+t)] for the solution of the oscillator equation of motion q + w2(t) q = 0.
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Here the frequency w is a slowly varying function of time, tending to constant limits w as
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t
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+ 00. The limiting values of I are given in terms of these coefficients by I = tw+/c+l2.
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The solution is known from quantum mechanics, on account of the formal resemblance
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between the above equation of motion and SCHRODINGER'S equation 4" + k2(x) 4 = 0 for
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one-dimensional motion of a particle above a slowly varying (quasi-classical) "potential
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barrier". The problem of finding the relation between the asymptotic (x + 00)
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expressions
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for & is equivalent to that of finding the "reflection coefficient" of the potential barrier; see
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Quantum Mechanics, $52, Pergamon Press, Oxford 1965.
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This method of determining the exactness of conservation of the adiabatic invariant for an
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oscillator is due to L. P. PITAEVSKII. The relevant calculations are given by A. M. DYKHNE,
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Soviet Physics JETP 11, 411, 1960. The analysis for the general case of an arbitrary finite
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motion in one dimension is given by A.A. SLUTSKIN, Soviet Physics JETP 18, 676, 1964.
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158
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The Canonical Equations
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§50
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as may also be seen directly from formula (49.11) and the expression (49.6)
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for the period.
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Conversely, if we express q and P, or any one-valued function F(p, q) of
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them, in terms of the canonical variables, then they remain unchanged when
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W increases by 2nd (with I constant). That is, any one-valued function F(p, q),
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when expressed in terms of the canonical variables, is a periodic function of W
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with period 2.
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$50. General properties of motion in S dimensions
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Let us consider a system with any number of degrees of freedom, executing
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a motion finite in all the co-ordinates, and assume that the variables can be
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completely separated in the Hamilton-Jacobi treatment. This means that,
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when the co-ordinates are appropriately chosen, the abbreviated action
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can be written in the form
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(50.1)
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as a sum of functions each depending on only one co-ordinate.
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Since the generalised momenta are Pi = aso/dqi = dSi/dqi, each function
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Si can be written
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(50.2)
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These are many-valued functions. Since the motion is finite, each co-ordinate
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can take values only in a finite range. When qi varies "there and back" in this
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range, the action increases by
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(50.3)
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where
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(50.4)
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the integral being taken over the variation of qi just mentioned.
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Let us now effect a canonical transformation similar to that used in 49,
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for the case of a single degree of freedom. The new variables are "action vari-
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ables" Ii and "angle variables"
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w(a(q
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(50.5)
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+ It should be emphasised, however, that this refers to the formal variation of the co-
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ordinate qi over the whole possible range of values, not to its variation during the period of
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the actual motion as in the case of motion in one dimension. An actual finite motion of a
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system with several degrees of freedom not only is not in general periodic as a whole, but
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does not even involve a periodic time variation of each co-ordinate separately (see below).
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§50
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General properties of motion in S dimensions
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159
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where the generating function is again the action expressed as a function of
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the co-ordinates and the Ii. The equations of motion in these variables are
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Ii = 0, w = de(I)/I, which give
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I=constant,
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(50.6)
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+ constant.
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(50.7)
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We also find, analogously to (49.13), that a variation "there and back" of
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the co-ordinate qi corresponds to a change of 2n in Wi:
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Awi==2m
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(50.8)
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In other words, the quantities Wi(q, I) are many-valued functions of the co-
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ordinates: when the latter vary and return to their original values, the Wi
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may vary by any integral multiple of 2. This property may also be formulated
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as a property of the function Wi(P, q), expressed in terms of the co-ordinates
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and momenta, in the phase space of the system. Since the Ii, expressed in
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terms of P and q, are one-valued functions, substitution of Ii(p, q) in wi(q, I)
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gives a function wilp, q) which may vary by any integral multiple of 2n
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(including zero) on passing round any closed path in phase space.
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Hence it follows that any one-valued function F(P, q) of the state of the
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system, if expressed in terms of the canonical variables, is a periodic function
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of the angle variables, and its period in each variable is 2nr. It can be expanded
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as a multiple Fourier series:
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(50.9)
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ls==
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where l1, l2, ls are integers. Substituting the angle variables as functions
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of time, we find that the time dependence of F is given by a sum of the form
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(50.10)
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lg==
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Each term in this sum is a periodic function of time, with frequency
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(50.11)
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Since these frequencies are not in general commensurable, the sum itself is
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not a periodic function, nor, in particular, are the co-ordinates q and
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momenta P of the system.
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Thus the motion of the system is in general not strictly periodic either as a
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whole or in any co-ordinate. This means that, having passed through a given
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state, the system does not return to that state in a finite time. We can say,
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t Rotational co-ordinates (see the first footnote to 49) are not in one-to-one relation
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with the state of the system, since the position of the latter is the same for all values of
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differing by an integral multiple of 2nr. If the co-ordinates q include such angles, therefore,
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these can appear in the function F(P, q) only in such expressions as cos and sin , which
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are in one-to-one relation with the state of the system.
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160
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The Canonical Equations
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§50
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however, that in the course of a sufficient time the system passes arbitrarily
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close to the given state. For this reason such a motion is said to be conditionally
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periodic.
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In certain particular cases, two or more of the fundamental frequencies
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Wi = DE/DI are commensurable for arbitrary values of the Ii. This is called
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degeneracy, and if all S frequencies are commensurable, the motion of the
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system is said to be completely degenerate. In the latter case the motion is
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evidently periodic, and the path of every particle is closed.
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The existence of degeneracy leads, first of all, to a reduction in the number
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of independent quantities Ii on which the energy of the system depends.
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If two frequencies W1 and W2 are such that
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(50.12)
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where N1 and N2 are integers, then it follows that I1 and I2 appear in the energy
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only as the sum n2I1+n1I2.
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A very important property of degenerate motion is the increase in the
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number of one-valued integrals of the motion over their number for a general
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non-degenerate system with the same number of degrees of freedom. In the
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latter case, of the 2s-1 integrals of the motion, only s functions of the state
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of the system are one-valued; these may be, for example, the S quantities I
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The remaining S - 1 integrals may be written as differences
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(50.13)
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The constancy of these quantities follows immediately from formula (50.7),
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but they are not one-valued functions of the state of the system, because the
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angle variables are not one-valued.
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When there is degeneracy, the situation is different. For example, the rela-
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tion (50.12) shows that, although the integral
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WIN1-W2N2
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(50.14)
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is not one-valued, it is so except for the addition of an arbitrary integral
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multiple of 2nr. Hence we need only take a trigonometrical function of this
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quantity to obtain a further one-valued integral of the motion.
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An example of degeneracy is motion in a field U = -a/r (see Problem).
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There is consequently a further one-valued integral of the motion (15.17)
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peculiar to this field, besides the two (since the motion is two-dimensional)
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ordinary one-valued integrals, the angular momentum M and the energy E,
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which hold for motion in any central field.
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It may also be noted that the existence of further one-valued integrals
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leads in turn to another property of degenerate motions: they allow a complete
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separation of the variables for several (and not only one+) choices of the co-
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t We ignore such trivial changes in the co-ordinates as q1' = q1'(q1), q2' = 92'(92). |