406 lines
No EOL
18 KiB
Text
406 lines
No EOL
18 KiB
Text
|
|
CHAPTER VII
|
|
THE CANONICAL EQUATIONS
|
|
§40. Hamilton's equations
|
|
THE formulation of the laws of mechanics in terms of the Lagrangian, and
|
|
of Lagrange's equations derived from it, presupposes that the mechanical
|
|
state of a system is described by specifying its generalised co-ordinates and
|
|
velocities. This is not the only possible mode of description, however. A
|
|
number of advantages, especially in the study of certain general problems of
|
|
mechanics, attach to a description in terms of the generalised co-ordinates
|
|
and momenta of the system. The question therefore arises of the form of
|
|
the equations of motion corresponding to that formulation of mechanics.
|
|
The passage from one set of independent variables to another can be
|
|
effected by means of what is called in mathematics Legendre's transformation.
|
|
In the present case this transformation is as follows. The total differential
|
|
of the Lagrangian as a function of co-ordinates and velocities is
|
|
dL =
|
|
This expression may be written
|
|
(40.1)
|
|
since the derivatives aL/dqi are, by definition, the generalised momenta, and
|
|
aL/dqi = pi by Lagrange's equations. Writing the second term in (40.1) as
|
|
= - Eqi dpi, taking the differential d(piqi) to the left-hand
|
|
side, and reversing the signs, we obtain from (40.1)
|
|
The argument of the differential is the energy of the system (cf. §6);
|
|
expressed in terms of co-ordinates and momenta, it is called the Hamilton's
|
|
function or Hamiltonian of the system:
|
|
(40.2)
|
|
t The reader may find useful the following table showing certain differences between the
|
|
nomenclature used in this book and that which is generally used in the English literature.
|
|
Here
|
|
Elsewhere
|
|
Principle of least action
|
|
Hamilton's principle
|
|
Maupertuis' principle
|
|
Principle of least action
|
|
Maupertuis' principle
|
|
Action
|
|
Hamilton's principal function
|
|
Abbreviated action
|
|
Action
|
|
- -Translators.
|
|
131
|
|
132
|
|
The Canonical Equations
|
|
§40
|
|
From the equation in differentials
|
|
dH =
|
|
(40.3)
|
|
in which the independent variables are the co-ordinates and momenta, we
|
|
have the equations
|
|
=
|
|
(40.4)
|
|
These are the required equations of motion in the variables P and q, and
|
|
are called Hamilton's equations. They form a set of 2s first-order differential
|
|
equations for the 2s unknown functions Pi(t) and qi(t), replacing the S second-
|
|
order equations in the Lagrangian treatment. Because of their simplicity and
|
|
symmetry of form, they are also called canonical equations.
|
|
The total time derivative of the Hamiltonian is
|
|
Substitution of qi and pi from equations (40.4) shows that the last two terms
|
|
cancel, and so
|
|
dH/dt==Hoo.
|
|
(40.5)
|
|
In particular, if the Hamiltonian does not depend explicitly on time, then
|
|
dH/dt = 0, and we have the law of conservation of energy.
|
|
As well as the dynamical variables q, q or q, P, the Lagrangian and the
|
|
Hamiltonian involve various parameters which relate to the properties of the
|
|
mechanical system itself, or to the external forces on it. Let A be one such
|
|
parameter. Regarding it as a variable, we have instead of (40.1)
|
|
dL
|
|
and (40.3) becomes
|
|
dH =
|
|
Hence
|
|
(40.6)
|
|
which relates the derivatives of the Lagrangian and the Hamiltonian with
|
|
respect to the parameter A. The suffixes to the derivatives show the quantities
|
|
which are to be kept constant in the differentiation.
|
|
This result can be put in another way. Let the Lagrangian be of the form
|
|
L = Lo + L', where L' is a small correction to the function Lo. Then the
|
|
corresponding addition H' in the Hamiltonian H = H + H' is related to L'
|
|
by
|
|
(H')p,a - (L')
|
|
(40.7)
|
|
It may be noticed that, in transforming (40.1) into (40.3), we did not
|
|
include a term in dt to take account of a possible explicit time-dependence
|
|
§41
|
|
The Routhian
|
|
133
|
|
of the Lagrangian, since the time would there be only a parameter which
|
|
would not be involved in the transformation. Analogously to formula (40.6),
|
|
the partial time derivatives of L and H are related by
|
|
(40.8)
|
|
PROBLEMS
|
|
PROBLEM 1. Find the Hamiltonian for a single particle in Cartesian, cylindrical and
|
|
spherical co-ordinates.
|
|
SOLUTION. In Cartesian co-ordinates x, y, 2,
|
|
in cylindrical co-ordinates r, , z,
|
|
in spherical co-ordinates r, 0, ,
|
|
PROBLEM 2. Find the Hamiltonian for a particle in a uniformly rotating frame of reference.
|
|
SOLUTION. Expressing the velocity V in the energy (39.11) in terms of the momentum p
|
|
by (39.10), we have H = p2/2m-S rxp+U.
|
|
PROBLEM 3. Find the Hamiltonian for a system comprising one particle of mass M and n
|
|
particles each of mass m, excluding the motion of the centre of mass (see §13, Problem).
|
|
SOLUTION. The energy E is obtained from the Lagrangian found in §13, Problem, by
|
|
changing the sign of U. The generalised momenta are
|
|
Pa = OL/OV
|
|
Hence
|
|
-
|
|
= (mM/14)
|
|
=
|
|
=
|
|
Substitution in E gives
|
|
41. The Routhian
|
|
In some cases it is convenient, in changing to new variables, to replace
|
|
only some, and not all, of the generalised velocities by momenta. The trans-
|
|
formation is entirely similar to that given in 40.
|
|
To simplify the formulae, let us at first suppose that there are only two
|
|
co-ordinates q and E, say, and transform from the variables q, $, q, $ to
|
|
q, $, p, & where P is the generalised momentum corresponding to the co-
|
|
ordinate q.
|
|
134
|
|
The Canonical Equations
|
|
§42
|
|
The differential of the Lagrangian L(q, $, q, §) is
|
|
dL = dq + (al/dg) ds (0L/as) d
|
|
d,
|
|
whence
|
|
= (0L/d) d.
|
|
If we define the Routhian as
|
|
= pq-L,
|
|
(41.1)
|
|
in which the velocity q is expressed in terms of the momentum P by means
|
|
of the equation P = 0L/dq, then its differential is
|
|
dR = - ds - (aL/a)
|
|
(41.2)
|
|
Hence
|
|
DRIP, p = OR/dq,
|
|
(41.3)
|
|
(41.4)
|
|
Substituting these equations in the Lagrangian for the co-ordinate $, we have
|
|
(41.5)
|
|
Thus the Routhian is a Hamiltonian with respect to the co-ordinate q
|
|
(equations (41.3)) and a Lagrangian with respect to the co-ordinate $ (equation
|
|
(41.5)).
|
|
According to the general definition the energy of the system is
|
|
E -p-L =
|
|
In terms of the Routhian it is
|
|
E=R-R,
|
|
(41.6)
|
|
as we find by substituting (41.1) and (41.4).
|
|
The generalisation of the above formulae to the case of several co-ordinates
|
|
q and & is evident.
|
|
The use of the Routhian may be convenient, in particular, when some of
|
|
the co-ordinates are cyclic. If the co-ordinates q are cyclic, they do not appear
|
|
in the Lagrangian, nor therefore in the Routhian, so that the latter is a func-
|
|
tion of P, $ and $. The momenta P corresponding to cyclic co-ordinates are
|
|
constant, as follows also from the second equation (41.3), which in this sense
|
|
contains no new information. When the momenta P are replaced by their
|
|
given constant values, equations (41.5) (d/dt) JR(p, $, 5)108 = JR(P, &, §) 128
|
|
become equations containing only the co-ordinates $, so that the cyclic co-
|
|
ordinates are entirely eliminated. If these equations are solved for the func-
|
|
tions (t), substitution of the latter on the right-hand sides of the equations
|
|
q = JR(p, $, E) gives the functions q(t) by direct integration.
|
|
PROBLEM
|
|
Find the Routhian for a symmetrical top in an external field U(, 0), eliminating the cyclic
|
|
co-ordinate 4 (where 4, , 0 are Eulerian angles).
|
|
§42
|
|
Poisson brackets
|
|
135
|
|
SOLUTION. The Lagrangian is = see
|
|
§35, Problem 1. The Routhian is
|
|
R = cos 0);
|
|
the first term is a constant and may be omitted.
|
|
42. Poisson brackets
|
|
Let f (p, q, t) be some function of co-ordinates, momenta and time. Its
|
|
total time derivative is
|
|
df
|
|
Substitution of the values of and Pk given by Hamilton's equations (40.4)
|
|
leads to the expression
|
|
(42.1)
|
|
where
|
|
(42.2)
|
|
dqk
|
|
This expression is called the Poisson bracket of the quantities H and f.
|
|
Those functions of the dynamical variables which remain constant during
|
|
the motion of the system are, as we know, called integrals of the motion.
|
|
We see from (42.1) that the condition for the quantity f to be an integral of
|
|
the motion (df/dt = 0) can be written
|
|
af(dt+[H,f]=0
|
|
(42.3)
|
|
If the integral of the motion is not explicitly dependent on the time, then
|
|
[H,f] = 0,
|
|
(42.4)
|
|
i.e. the Poisson bracket of the integral and the Hamiltonian must be zero.
|
|
For any two quantities f and g, the Poisson bracket is defined analogously
|
|
to (42.2):
|
|
(42.5)
|
|
The Poisson bracket has the following properties, which are easily derived
|
|
from its definition.
|
|
If the two functions are interchanged, the bracket changes sign; if one of
|
|
the functions is a constant c, the bracket is zero:
|
|
(42.6)
|
|
[f,c]=0.
|
|
(42.7)
|
|
Also
|
|
[f1+f2,g]=[f1,g)+[f2,g]
|
|
(42.8)
|
|
[f1f2,g] ]=fi[fa,8]+f2[f1,8] =
|
|
(42.9)
|
|
Taking the partial derivative of (42.5) with respect to time, we obtain
|
|
(42.10)
|
|
136
|
|
The Canonical Equations
|
|
§42
|
|
If one of the functions f and g is one of the momenta or co-ordinates, the
|
|
Poisson bracket reduces to a partial derivative:
|
|
(42.11)
|
|
(42.12)
|
|
Formula (42.11), for example, may be obtained by putting g = qk in (42.5);
|
|
the sum reduces to a single term, since dqk/dqi = 8kl and dqk/dpi = 0. Put-
|
|
ting in (42.11) and (42.12) the function f equal to qi and Pi we have, in parti-
|
|
cular,
|
|
[qi,qk] = [Pi, Pk] =0, [Pi, 9k] = Sik.
|
|
(42.13)
|
|
The relation
|
|
[f,[g,h]]+[g,[h,f]]+[h,[f,g]] = 0,
|
|
(42.14)
|
|
known as Jacobi's identity, holds between the Poisson brackets formed from
|
|
three functions f, g and h. To prove it, we first note the following result.
|
|
According to the definition (42.5), the Poisson bracket [f,g] is a bilinear
|
|
homogeneous function of the first derivatives of f and g. Hence the bracket
|
|
[h,[f,g]], for example, is a linear homogeneous function of the second
|
|
derivatives of f and g. The left-hand side of equation (42.14) is therefore a
|
|
linear homogeneous function of the second derivatives of all three functions
|
|
f, g and h. Let us collect the terms involving the second derivatives of f.
|
|
The first bracket contains no such terms, since it involves only the first
|
|
derivatives of f. The sum of the second and third brackets may be symboli-
|
|
cally written in terms of the linear differential operators D1 and D2, defined by
|
|
D1() = [g, ], D2(b) = [h, ]. Then
|
|
3,[h,f]]+[h,[f,g]] = [g, [h,f]]-[h,[g,f]
|
|
= D1[D2(f)]-D2[D1(f)]
|
|
= (D1D2-D2D1)f.
|
|
It is easy to see that this combination of linear differential operators cannot
|
|
involve the second derivatives of f. The general form of the linear differential
|
|
operators is
|
|
where & and Nk are arbitrary functions of the variables .... Then
|
|
and the difference of these,
|
|
§42
|
|
Poisson brackets
|
|
137
|
|
is again an operator involving only single differentiations. Thus the terms in
|
|
the second derivatives of f on the left-hand side of equation (42.14) cancel
|
|
and, since the same is of course true of g and h, the whole expression is identi-
|
|
cally zero.
|
|
An important property of the Poisson bracket is that, if f and g are two
|
|
integrals of the motion, their Poisson bracket is likewise an integral of the
|
|
motion:
|
|
[f,g] = constant. =
|
|
(42.15)
|
|
This is Poisson's theorem. The proof is very simple if f and g do not depend
|
|
explicitly on the time. Putting h = H in Jacobi's identity, we obtain
|
|
[H,[f,g]]+[f,[g,H]]+[g,[H,fl]=0.
|
|
Hence, if [H, g] =0 and [H,f] = 0, then [H,[f,g]] = 0, which is the
|
|
required result.
|
|
If the integrals f and g of the motion are explicitly time-dependent, we
|
|
put, from (42.1),
|
|
Using formula (42.10) and expressing the bracket [H, [f,g]] in terms of two
|
|
others by means of Jacobi's identity, we find
|
|
d
|
|
[
|
|
(42.16)
|
|
which evidently proves Poisson's theorem.
|
|
Of course, Poisson's theorem does not always supply further integrals of
|
|
the motion, since there are only 2s-1 - of these (s being the number of degrees
|
|
of freedom). In some cases the result is trivial, the Poisson bracket being a
|
|
constant. In other cases the integral obtained is simply a function of the ori-
|
|
ginal integrals f and g. If neither of these two possibilities occurs, however,
|
|
then the Poisson bracket is a further integral of the motion.
|
|
PROBLEMS
|
|
PROBLEM 1. Determine the Poisson brackets formed from the Cartesian components of
|
|
the momentum p and the angular momentum M = rxp of a particle.
|
|
SOLUTION. Formula (42.12) gives [Mx, Py] = -MM/Dy = -d(yp:-2py)/dy
|
|
=
|
|
-Pz,
|
|
and similarly [Mx, Px] = 0, [Mx, P2] = Py. The remaining brackets are obtained by cyclically
|
|
permuting the suffixes x, y, Z.
|
|
6
|
|
138
|
|
The Canonical Equations
|
|
§43
|
|
PROBLEM 2. Determine the Poisson brackets formed from the components of M.
|
|
SOLUTION. A direct calculation from formula (42.5) gives [Mx, My] = -M2, [My, M]
|
|
= -Mx, [Mz, Mx] = -My.
|
|
Since the momenta and co-ordinates of different particles are mutually independent variables,
|
|
it is easy to see that the formulae derived in Problems 1 and 2 are valid also for the total
|
|
momentum and angular momentum of any system of particles.
|
|
PROBLEM 3. Show that [, M2] = 0, where is any function, spherically symmetrical
|
|
about the origin, of the co-ordinates and momentum of a particle.
|
|
SOLUTION. Such a function can depend on the components of the vectors r and p only
|
|
through the combinations r2, p2, r. p. Hence
|
|
and similarly for The required relation may be verified by direct calculation from
|
|
formula (42.5), using these formulae for the partial derivatives.
|
|
PROBLEM 4. Show that [f, M] = n xf, where f is a vector function of the co-ordinates
|
|
and momentum of a particle, and n is a unit vector parallel to the z-axis.
|
|
SOLUTION. An arbitrary vector f(r,p) may be written as f = where
|
|
01, O2, 03 are scalar functions. The required relation may be verified by direct calculation
|
|
from formulae (42.9), (42.11), (42.12) and the formula of Problem 3.
|
|
$43. The action as a function of the co-ordinates
|
|
In formulating the principle of least action, we have considered the integral
|
|
(43.1)
|
|
taken along a path between two given positions q(1) and q(2) which the system
|
|
occupies at given instants t1 and t2. In varying the action, we compared the
|
|
values of this integral for neighbouring paths with the same values of q(t1)
|
|
and q(t2). Only one of these paths corresponds to the actual motion, namely
|
|
the path for which the integral S has its minimum value.
|
|
Let us now consider another aspect of the concept of action, regarding S
|
|
as a quantity characterising the motion along the actual path, and compare
|
|
the values of S for paths having a common beginning at q(t1) = q(1), but
|
|
passing through different points at time t2. In other words, we consider the
|
|
action integral for the true path as a function of the co-ordinates at the upper
|
|
limit of integration.
|
|
The change in the action from one path to a neighbouring path is given
|
|
(if there is one degree of freedom) by the expression (2.5):
|
|
8S =
|
|
Since the paths of actual motion satisfy Lagrange's equations, the integral
|
|
in 8S is zero. In the first term we put Sq(t1) = 0, and denote the value of
|
|
§43
|
|
The action as a function of the co-ordinates
|
|
139
|
|
8q(t2) by 8q simply. Replacing 0L/dq by p, we have finally 8S = pdq or, in
|
|
the general case of any number of degrees of freedom,
|
|
ES==Pisqu-
|
|
(43.2)
|
|
From this relation it follows that the partial derivatives of the action with
|
|
respect to the co-ordinates are equal to the corresponding momenta:
|
|
=
|
|
(43.3)
|
|
The action may similarly be regarded as an explicit function of time, by
|
|
considering paths starting at a given instant t1 and at a given point q(1), and
|
|
ending at a given point q(2) at various times t2 = t. The partial derivative
|
|
asiat thus obtained may be found by an appropriate variation of the integral.
|
|
It is simpler, however, to use formula (43.3), proceeding as follows.
|
|
From the definition of the action, its total time derivative along the path is
|
|
dS/dt = L.
|
|
(43.4)
|
|
Next, regarding S as a function of co-ordinates and time, in the sense des-
|
|
cribed above, and using formula (43.3), we have
|
|
dS
|
|
A comparison gives asid = L- or
|
|
(43.5)
|
|
Formulae (43.3) and (43.5) may be represented by the expression
|
|
(43.6)
|
|
for the total differential of the action as a function of co-ordinates and time
|
|
at the upper limit of integration in (43.1). Let us now suppose that the co-
|
|
ordinates (and time) at the beginning of the motion, as well as at the end,
|
|
are variable. It is evident that the corresponding change in S will be given
|
|
by the difference of the expressions (43.6) for the beginning and end of the
|
|
path, i.e.
|
|
dsp
|
|
(43.7)
|
|
This relation shows that, whatever the external forces on the system during
|
|
its motion, its final state cannot be an arbitrary function of its initial state;
|
|
only those motions are possible for which the expression on the right-hand
|
|
side of equation (43.7) is a perfect differential. Thus the existence of the
|
|
principle of least action, quite apart from any particular form of the Lagran-
|
|
gian, imposes certain restrictions on the range of possible motions. In parti-
|
|
cular, it is possible to derive a number of general properties, independent
|
|
of the external fields, for beams of particles diverging from given points in
|
|
140
|
|
The Canonical Equations
|
|
§44
|
|
space. The study of these properties forms a part of the subject of geometrical
|
|
optics.+
|
|
It is of interest to note that Hamilton's equations can be formally derived
|
|
from the condition of minimum action in the form
|
|
(43.8)
|
|
which follows from (43.6), if the co-ordinates and momenta are varied inde-
|
|
pendently. Again assuming for simplicity that there is only one co-ordinate
|
|
and momentum, we write the variation of the action as
|
|
= dt - (OH/dp)8p dt].
|
|
An integration by parts in the second term gives
|
|
At the limits of integration we must put 8q = 0, so that the integrated term
|
|
is zero. The remaining expression can be zero only if the two integrands
|
|
vanish separately, since the variations Sp and 8q are independent and arbitrary
|
|
dq = (OH/OP) dt, dp = - (dH/dq) dt, which, after division by dt, are
|
|
Hamilton's equations.
|
|
$44. Maupertuis' principle
|
|
The motion of a mechanical system is entirely determined by the principle
|
|
of least action: by solving the equations of motion which follow from that
|
|
principle, we can find both the form of the path and the position on the path
|
|
as a function of time.
|
|
If the problem is the more restricted one of determining only the path,
|
|
without reference to time, a simplified form of the principle of least action
|
|
may be used. We assume that the Lagrangian, and therefore the Hamilton-
|
|
ian, do not involve the time explicitly, SO that the energy of the system is
|
|
conserved: H(p, q) = E = constant. According to the principle of least action,
|
|
the variation of the action, for given initial and final co-ordinates and times
|
|
(to and t, say), is zero. If, however, we allow a variation of the final time t,
|
|
the initial and final co-ordinates remaining fixed, we have (cf.(43.7))
|
|
8S = -Hot.
|
|
(44.1)
|
|
We now compare, not all virtual motions of the system, but only those
|
|
which satisfy the law of conservation of energy. For such paths we can
|
|
replace H in (44.1) by a constant E, which gives
|
|
SS+Est=0.
|
|
(44.2)
|
|
t See The Classical Theory of Fields, Chapter 7, Pergamon Press, Oxford 1962. |