When I was in high school, my physics teacher called me down one day after class and said, “You look bored, I want to tell you something interesting”. Then he told me something I have always found fascinating. Every time the subject comes up I work on it.
Richard Feynman
Feynman’s teacher told him about the “Principle of Least Action”, one of the most profound results in physics.
Firstly, let’s get our notation right. Part of the power of the Lagrangian formulation over the Newtonian approach is that it does away with vectors in favour of more general coordinates. We start by doing this trivially. Let’s rewrite the positions of particles with coordinates as where . Then Newton’s equations read
(2.26) |
where . The number of degrees of freedom of the system is said to be . These parameterise a -dimensional space known as the configuration space . Each point in specifies a configuration of the system (i.e. the positions of all particles). Time evolution gives rise to a curve in .
Define the Lagrangian to be a function of the positions and the velocities of all the particles, given by
(2.27) |
where is the kinetic energy, and is the potential energy. Note the minus sign between and ! To describe the principle of least action, we consider all smooth paths in with fixed end points so that
(2.28) |
Of all these possible paths, only one is the true path taken by the system. Which one? To each path, let us assign a number called the action defined as
(2.29) |
The action is a functional (i.e. a function of the path which is itself a function). The principle of least action is the following result:
(2.30) |
where we fix the end points of the path by demanding . Then the change in the action is
(2.31) | |||||
At this point we integrate the second term by parts to get
(2.32) |
But the final term vanishes since we have fixed the end points of the path so . The requirement that the action is an extremum says that for all changes in the path . We see that this holds if and only if
(2.33) |
These are known as Lagrange’s equations (or sometimes as the Euler-Lagrange equations). To finish the proof, we need only show that Lagrange’s equations are equivalent to Newton’s. From the definition of the Lagrangian (2.27), we have , while . It’s then easy to see that equations (2.33) are indeed equivalent to (2.26).
Some remarks on this important result:
This is an example of a variational principle which you already met in the eponymous “variational principles” course.
The principle of least action is a slight misnomer. The proof only requires that , and does not specify whether it is a maxima or minima of . Since , we can always increase by taking a very fast, wiggly path with , so the true path is never a maximum. However, it may be either a minimum or a saddle point. So “Principle of stationary action” would be a more accurate, but less catchy, name. It is sometimes called “Hamilton’s principle”.
All the fundamental laws of physics can be written in terms of an action principle. This includes electromagnetism, general relativity, the standard model of particle physics, and attempts to go beyond the known laws of physics such as string theory. For example, (nearly) everything we know about the universe is captured in the Lagrangian
(2.34) |
where the terms carry the names of Einstein, Maxwell (or Yang and Mills) and Dirac respectively, and describe gravity, the forces of nature (electromagnetism and the nuclear forces) and the dynamics of particles like electrons and quarks. If you want to understand what the terms in this equation really mean, then you can find explanations in the lectures on General Relativity, Electromagnetism, and Quantum Field Theory.
There is a beautiful generalisation of the action principle to quantum mechanics due to Feynman in which the particle takes all paths with some probability determined by . We will describe this in Section 4.8.
Back to classical mechanics, there are two very important reasons for working with Lagrange’s equations rather than Newton’s. The first is that Lagrange’s equations hold in any coordinate system, while Newton’s are restricted to an inertial frame. The second is the ease with which we can deal with constraints in the Lagrangian system. We’ll look at these two aspects in the next two subsections.
We shall now show that Lagrange’s equations hold in any coordinate system. In fact, this follows immediately from the action principle, which is a statement about paths and not about coordinates. But here we shall be a little more pedestrian in order to explain exactly what we mean by changing coordinates, and why it’s useful. Let
(2.35) |
where we’ve included the possibility of using a coordinate system which changes with time . Then, by the chain rule, we can write
(2.36) |
In this equation, and for the rest of this course, we’re using the “summation convention” in which repeated indices are summed over. Note also that we won’t be too careful about whether indices are up or down - it won’t matter for the purposes of this course. To be a good coordinate system, we should be able to invert the relationship so that which we can do as long as we have . Then we have,
(2.37) |
Now we can examine when we substitute in . Using (2.37) we have
(2.38) |
while
(2.39) |
We now use the fact that we can “cancel the dots” and which we can prove by substituting the expression for into the LHS. Taking the time derivative of (2.39) gives us
(2.40) |
So combining (2.38) with (2.40) we find
(2.41) |
Equation (2.41) is our final result. We see that if Lagrange’s equation is solved in the coordinate system (so that on the RHS vanishes) then it is also solved in the coordinate system. (Conversely, if it is satisfied in the coordinate system, so the LHS vanishes, then it is also satisfied in the coordinate system as long as our choice of coordinates is invertible: i.e ).
So the form of Lagrange’s equations holds in any coordinate system. This is in contrast to Newton’s equations which are only valid in an inertial frame. Let’s illustrate the power of this fact with a couple of simple examples
Consider a free particle with Lagrangian given by
(2.42) |
with . Now measure the motion of the particle with respect to a coordinate system which is rotating with angular velocity about the axis. If are the coordinates in the rotating system, we have the relationship
(2.43) |
Then we can substitute these expressions into the Lagrangian to find in terms of the rotating coordinates,
(2.44) |
In this rotating frame, we can use Lagrange’s equations to derive the equations of motion. Taking derivatives, we have
(2.45) |
so Lagrange’s equation reads
(2.46) |
The second and third terms in this expression are the centrifugal and coriolis forces respectively. These are examples of the “fictitious forces” that you were warned about in the first year. They’re called fictitious because they’re a consequence of the reference frame, rather than any interaction. But don’t underestimate their importance just because they’re “fictitious”! According to Einstein’s theory of General Relativity, the force of gravity is on the same footing as these fictitious forces.
The centrifugal force points outwards in the plane perpendicular to with magnitude where denotes the projection perpendicular to .
The coriolis force is responsible for the large scale circulation of oceans and the atmosphere. For a particle travelling on the surface of the rotating earth, the direction of the coriolis force is drawn in figure 4. We see that a particle thrown in the northern hemisphere will be seen to rotate in a clockwise direction; a particle thrown in the southern hemisphere rotates in an anti-clockwise direction. For a particle moving along the equator, the coriolis force points directly upwards, so has no effect on the particle.
More details on the effect of the Coriolis force in various circumstances can be found in the Dynamics and Relativity lecture notes. Questions discussed include:
The coriolis force is responsible for the formation of hurricanes. These rotate in different directions in the northern and southern hemisphere, and never form within 500 miles of the equator where the coriolis force is irrelevant. But hurricanes rotate anti-clockwise in the northern hemisphere. This is the opposite direction from what we deduced above for a projected particle! What did we miss?
Estimate the magnitude of the coriolis force. Do you think that it really affects the motion of water going down a plughole? What about the direction in which a CD spins?
Stand on top of a tower at the equator and drop a ball. As the ball falls, the earth turns underneath from west to east. Does the ball land
At the base of the tower?
To the east?
To the west?
A particle moves in the plane with a force directed towards the origin with magnitude proportional to the distance from . How does it move? In Cartesian coordinates, this problem is easy. We have the Lagrangian
(2.47) |
Let’s set for simplicity. The equation of motion for this system is simply
(2.48) |
Now suppose we want to know the motion of the system in hyperbolic coordinates defined as
(2.49) |
The coordinates and are curvilinear and orthogonal (i.e. two hyperbolics intersect at ). We could try solving this problem by substituting the change of coordinates directly into the equations of motion. It’s a mess. (Try if you don’t believe me!). A much simpler way is to derive expressions for and in terms of the new coordinates and substitute into the Lagrangian to find,
(2.50) |
From which we can easily derive the equation of motion for
(2.51) | |||||
Which is also a mess! But it’s a mess that was much simpler to derive. Moreover, we don’t need to do any more work to get the second equation for : the symmetry of the Lagrangian means that it must be the same as (2.51) with interchanged.
Now we turn to the second advantage of the Lagrangian formulation. In writing , we implicitly assume that each particle can happily roam anywhere in space . What if there are constraints? In Newtonian mechanics, we introduce “constraint forces”. These are things like the tension of ropes, and normal forces applied by surfaces. In the Lagrangian formulation, we don’t have to worry about such things. In this section, we’ll show why.
The simple pendulum has a single dynamical degree of freedom , the angle the pendulum makes with the vertical. The position of the mass in the plane is described by two cartesian coordinates and subject to a constraint . We can parameterise this as and . Employing the Newtonian method to solve this system, we introduce the tension as shown in the diagram and resolve the force vectors to find,
(2.52) |
To determine the motion of the system, we impose the constraints at the level of the equation of motion, and then easily find
(2.53) |
While this example was pretty straightforward to solve using Newtonian methods, things get rapidly harder when we consider more complicated constraints (and we’ll see plenty presently). Moreover, you may have noticed that half of the work of the calculation went into computing the tension . On occasion we’ll be interested in this. (For example, we might want to know how fast we can spin the pendulum before it breaks). But often we won’t care about these constraint forces, but will only want to know the motion of the pendulum itself. In this case it seems like a waste of effort to go through the motions of computing . We’ll now see how we can avoid this extra work in the Lagrangian formulation. Firstly, let’s define what we mean by constraints more rigorously.
Holonomic Constraints are relationships between the coordinates of the form
(2.54) |
In general the constraints can be time dependent and our notation above allows for this. Holonomic constraints can be solved in terms of generalised coordinates , . So
(2.55) |
The system is said to have degrees of freedom. For the pendulum example above, the system has a single degree of freedom, .
Now let’s see how the Lagrangian formulation deals with constraints of this form. We introduce new variables , called Lagrange multipliers and define a new Lagrangian
(2.56) |
We treat like new coordinates. Since doesn’t depend on , Lagrange’s equations for are
(2.57) |
which gives us back the constraints. Meanwhile, the equations for are
(2.58) |
The LHS is the equation of motion for the unconstrained system. The RHS is the manifestation of the constraint forces in the system. We can now solve these equations as we did in the Newtonian formulation.
The Lagrangian for the pendulum is given by that for a free particle moving in the plane, augmented by the Lagrange multiplier term for the constraints. It is
(2.59) |
From which we can calculate the two equations of motion for and ,
(2.60) |
while the equation of motion for reproduces the constraint . Comparing with the Newtonian approach (2.52), we again see that the Lagrange multiplier is proportional to the tension: .
So we see that we can easily incorporate constraint forces into the Lagrangian setup using Lagrange multipliers. But the big news is that we don’t have to! Often we don’t care about the tension or other constraint forces, but only want to know what the generalised coordinates are doing. In this case we have the following useful theorem
(2.61) |
(2.62) |
We know that Lagrange’s equations take the same form in these new coordinates. In particular, we may look at the equations for ,
(2.63) |
But, by definition, . So we are left with Lagrange’s equations purely in terms of , with no sign of the constraint forces. If we are only interested in the dynamics of the generalised coordinates , we may ignore the Lagrange multipliers and work entirely with the unconstrained Lagrangian defined in (2.61) where we just substitute in .
Let’s see how this works in the simple example of the pendulum. We can parameterise the constraints in terms of the generalised coordinate so that and . We now substitute this directly into the Lagrangian for a particle moving in the plane under the effect of gravity, to get
(2.64) | |||||
From which we may derive Lagrange’s equations using the coordinate directly
(2.65) |
which indeed reproduces the equation of motion for the pendulum (2.53). Note that, as promised, we haven’t calculated the tension using this method. This has the advantage that we’ve needed to do less work. If we need to figure out the tension, we have to go back to the more laborious Lagrange multiplier method.
For completeness, let’s quickly review a couple of non-holonomic constraints. There’s no general theory to solve systems of this type, although it turns out that both of the examples we describe here can be solved with relative ease using different methods. We won’t discuss non-holonomic constraints for the rest of this course, and include a brief description here simply to inform you of the sort of stuff we won’t see!
Consider a particle moving under gravity on the outside of a sphere of radius . It is constrained to satisfy . This type of constraint, involving an inequality, is non-holonomic. When the particle lies close to the top of the sphere, we know that it will remain in contact with the surface and we can treat the constraint effectively as holonomic. But at some point the particle will fall off. To determine when this happens requires different methods from those above (although it is not particularly difficult).
Constraints of the form which cannot be integrated to give are non-holonomic. For example, consider a coin of radius rolling down a slope as shown in figure 7. The coordinates fix the coin’s position on the slope. But the coin has other degrees of freedom as well: the angle it makes with the path of steepest descent, and the angle that a marked point on the rim of the coin makes with the vertical. If the coin rolls without slipping, then there are constraints on the evolution of these coordinates. We must have that the velocity of the rim is . So, in terms of our four coordinates, we have the constraint
(2.66) |
But these cannot be integrated to give constraints of the form . They are non-holonomic.
Let’s review what we’ve learnt so far. A system is described by generalised coordinates which define a point in an -dimensional configuration space . Time evolution is a curve in governed by the Lagrangian
(2.67) |
such that the obey
(2.68) |
These are coupled order (usually) non-linear differential equations. Before we move on, let’s take this opportunity to give an important definition. The quantity
(2.69) |
is called the generalised momentum conjugate to . (It only coincides with the real momentum in Cartesian coordinates). We can now rewrite Lagrange’s equations (2.68) as . The generalised momenta will play an important role in Section 4.
(2.70) |
for any function and the equations of motion remain unchanged. To see that the last statement is true, we could either plug into Lagrange’s equations or, alternatively, recall that Lagrange’s equations can be derived from an action principle and the action (which is the time integral of the Lagrangian) changes only by a constant under the transformation. (As an aside: A system no longer remains invariant under these transformations in quantum mechanics. The number is related to Planck’s constant, while transformations of the second type lead to rather subtle and interesting effects related to the mathematics of topology).
Lagrange11 1 You can read all about the lives of mathematicians at http://www-gap.dcs.st-and.ac.uk/ history/BiogIndex.html started off life studying law but changed his mind and turned to mathematics after reading a book on optics by Halley (of comet fame). Despite being mostly self-taught, by the age of 19 he was a professor in his home town of Turin.
He stayed in Italy, somewhat secluded, for the next 11 years although he communicated often with Euler and, in 1766, moved to Berlin to take up Euler’s recently vacated position. It was there he did his famous work on mechanics and the calculus of variations that we’ve seen above. In 1787 he moved once again, now to Paris. He was just in time for the French revolution and only survived a law ordering the arrest of all foreigners after the intervention of the chemist Lavoisier who was a rather powerful political figure. (One year later, Lavoisier lost his power, followed quickly by his head.)
Lagrange published his collected works on mechanics in 1788 in a book called “Mechanique Analytique”. He considered the work to be pure mathematics and boasts in the introduction that it contains no figures, thereby putting the anal in analytique.
Since I started with a quote about Newton’s teaching, I’ll include here a comment on Lagrange’s lectures by one of his more famous students:
“His voice is very feeble, at least in that he does not become heated; he has a very pronounced Italian accent and pronounces the s like z … The students, of whom the majority are incapable of appreciating him, give him little welcome, but the professors make amends for it.”
Fourier analysis of Lagrange
In this subsection we shall discuss the appearance of conservation laws in the Lagrangian formulation and, in particular, a beautiful and important theorem due to Noether relating conserved quantities to symmetries.
Let’s start with a definition. A function of the coordinates, their time derivatives and (possibly) time is called a constant of motion (or a conserved quantity) if the total time derivative vanishes
(2.71) |
whenever satisfy Lagrange’s equations. This means that remains constant along the path followed by the system. Here’s a couple of examples:
(2.72) |
is constant. When is written as a function of and , it is known as the Hamiltonian. It is usually identified with the total energy of the system.
(2.73) |
which vanishes whenever Lagrange’s equations (2.68) hold.
(2.74) |
(2.75) |
where we have used Lagrange’s equations (2.68) in the second equality.
Consider a one-parameter family of maps
(2.76) |
such that . Then this transformation is said to be a continuous symmetry of the Lagrangian if
(2.77) |
Noether’s theorem states that for each such symmetry there exists a conserved quantity.
(2.78) |
so we have
(2.79) | |||||
and the quantity , evaluated at , is constant for all time.
Consider the closed system of particles discussed in Section 1 with Lagrangian
(2.80) |
This Lagrangian has the symmetry of translation: for any vector and for any real number . This means that
(2.81) |
This is the statement that space is homogeneous and a translation of the system by does nothing to the equations of motion. These translations are elements of the Galilean group that we met in section 1.2. From Noether’s theorem, we can compute the conserved quantity associated with translations. It is
(2.82) |
which we recognise as the the total linear momentum in the direction . Since this holds for all , we conclude that is conserved. But this is very familiar. It is simply the conservation of total linear momentum. To summarise
Homogeneity of Space | Translation Invariance of | |||
Conservation of Total Linear Momentum |
This statement should be intuitively clear. One point in space is much the same as any other. So why would a system of particles speed up to get over there, when here is just as good? This manifests itself as conservation of linear momentum.
The isotropy of space is the statement that a closed system, described by the Lagrangian (2.80) is invariant under rotations around an axis , so all are rotated by the same amount. To work out the corresponding conserved quantities it will suffice to work with the infinitesimal form of the rotations
(2.83) | |||||
where is considered infinitesimal. To see that this is indeed a rotation, you could calculate the length of the vector and notice that it’s preserved to linear order in . Then we have
(2.84) |
which gives rise to the conserved quantity
(2.85) |
This is the component of the total angular momentum in the direction . Since the vector is arbitrary, we get the result
Isotropy of Space | Rotational Invariance of | |||
Conservation of Total Angular Momentum |
What about homogeneity of time? In mathematical language, this means is invariant under or, in other words, . But we already saw earlier in this section that this implies is conserved. In the systems we’re considering, this is simply the total energy. We see that the existence of a conserved quantity which we call energy can be traced to the homogeneous passage of time. Or
Time is to Energy as Space is to Momentum |
Recall from the lectures on Special Relativity that energy and 3-momentum fit together to form a 4-vector which rotates under spacetime transformations. Here we see that the link between energy-momentum and time-space exists even in the non-relativistic framework of Newtonian physics. You don’t have to be Einstein to see it. You just have to be Emmy Noether.
There are also discrete symmetries in Nature which don’t depend on a continuous parameter. For example, many theories are invariant under reflection (known as parity) in which . These types of symmetries do not give rise to conservation laws in classical physics (although they do in quantum physics).
Having developed all of these tools, let’s now apply them to a few examples.
This is an example of a system with a time dependent holonomic constraint. The hoop is of radius and rotates with frequency as shown in figure 9. The bead, of mass , is threaded on the hoop and moves without friction. We want to determine its motion. There is a single degree of freedom , the angle the bead makes with the vertical. In terms of Cartesian coordinates the position of the bead is
(2.86) |
To determine the Lagrangian in terms of the generalised coordinate we must substitute these expressions into the Lagrangian for the free particle. For the kinetic energy we have
(2.87) |
while the potential energy is given by (ignoring an overall constant)
(2.88) |
So, replacing , and by , we have the Lagrangian
(2.89) |
where the effective potential is
(2.90) |
We can now derive the equations of motion for the bead simply from Lagrange’s equations which read
(2.91) |
Let’s look for stationary solutions of these equations in which the bead doesn’t move (i.e solutions of the form ). From the equation of motion, we must solve to find that the bead can remain stationary at points satisfying
(2.92) |
There are at most three such points: , or . Note that the first two solutions always exist, while the third stationary point is only there if the hoop is spinning fast enough so that . Which of these stationary points is stable depends on whether has a local minimum (stable) or maximum (unstable). This
in turn depends on the value of . is drawn for several values of in figure 10. For , the point at the bottom of the hoop is stable, while for , the position at the bottom becomes unstable and the new solution at is the stable point. For all values of the bead perched at the top of the hoop is unstable.
A double pendulum is drawn in figure 11, consisting of two particles of mass and , connected by light rods of length and . For the first particle, the kinetic energy and the potential energy are the same as for a simple pendulum
(2.93) |
For the second particle it’s a little more involved. Consider the position of the second particle in the plane in which the pendulum swings (where we take the origin to be the pivot of the first pendulum with increasing downwards)
(2.94) |
Which we can substitute into the kinetic energy for the second particle
(2.95) | |||||
while the potential energy is given by
(2.96) |
The Lagrangian is given by the sum of the kinetic energies, minus the sum of the potential energies
(2.97) | |||||
The equations of motion follow by simple calculus using Lagrange’s two equations (one for and one for ). The solutions to these equations are complicated. In fact, above a certain energy, the motion is chaotic.
The spherical pendulum is allowed to rotate in three dimensions. The system has two degrees of freedom drawn in figure 12 which cover the range
(2.98) |
In terms of cartesian coordinates, we have
We substitute these constraints into the Lagrangian for a free particle to get
(2.99) | |||||
Notice that the coordinate is ignorable. From Noether’s theorem, we know that the quantity
(2.100) |
is constant. This is the component of angular momentum in the direction. The equation of motion for follows from Lagrange’s equations and is
(2.101) |
We can substitute for the constant in this expression to get an equation entirely in terms of which we chose to write as
(2.102) |
where the effective potential is defined to be
(2.103) |
An important point here: we must substitute for into the equations of motion. If you substitute for directly into the Lagrangian, you will derive an equation that looks like the one above, but you’ll get a minus sign wrong! This is because Lagrange’s equations are derived under the assumption that and are independent.
As well as the conservation of angular momentum , we also have so energy is conserved. This is given by
(2.104) |
where is a constant. In fact we can invert this equation for to solve for in terms of an integral
(2.105) |
If we succeed in writing the solution to a problem in terms of an integral like this then we say we’ve “reduced the problem to quadrature”. It’s kind of a cute way of saying we can’t do the integral. But at least we have an expression for the solution that we can play with or, if all else fails, we can simply plot on a computer.
Once we have an expression for we can solve for using the expression for ,
which gives us . Let’s get more of a handle on what these solutions look like. We plot the function in figure 13. For a given energy , the particle is restricted to the region (which follows from (2.104)). So from the figure we see that the motion is pinned between two points and . If we draw the motion of the pendulum in real space, it must therefore look something like figure 14, in which the bob oscillates between the two extremes: . Note that we could make more progress in understanding the motion of the spherical pendulum than for the double pendulum. The reason for this is the existence of two conservation laws for the spherical pendulum (energy and angular momentum) compared to just one (energy) for the double pendulum.
There is a stable orbit which lies between the two extremal points at , corresponding to the minimum of . This occurs if we balance the angular momentum and the energy just right. We can look at small oscillations around this point by expanding . Substituting into the equation of motion (2.102), we have
(2.106) |
so small oscillations about have frequency evaluated at .
We now turn to the study of two objects interacting through a central force. The most famous example of this type is the gravitational interaction between two bodies in the solar system which leads to the elliptic orbits of planets and the hyperbolic orbits of comets. Let’s see how to frame this famous physics problem in the Lagrangian setting. We start by rewriting the Lagrangian in terms of the centre of mass and the separation and work with an arbitrary potential
(2.107) | |||||
where is the reduced mass. The Lagrangian splits into a piece describing the centre of mass and a piece describing the separation. This is familiar from Section 1.3.2. From now on we neglect the centre of mass piece and focus on the separation. We know from Noether’s theorem that is conserved, where is the momentum conjugate to . Since is perpendicular to , the motion of the orbit must lie in a plane perpendicular to . Using polar coordinates in that plane, the Lagrangian is
(2.108) |
To make further progress, notice that is ignorable so, once again using Noether’s theorem, we have the conserved quantity
(2.109) |
This is also conservation of angular momentum: to reduce to the Lagrangian (2.108), we used the fact that the direction of is fixed; the quantity is related to the magnitude of . To figure out the motion we calculate Lagrange’s equation for from (2.108)
(2.110) |
We can eliminate from this equation by writing it in terms of the constant to get a differential equation for the orbit purely in terms of ,
(2.111) |
where the effective potential is given by
(2.112) |
The last term is known as the “angular momentum barrier”. Let me reiterate the warning of the spherical pendulum: do not substitute directly into the Lagrangian – you will get a minus sign wrong! You must substitute it into the equations of motion.
So far, you may recognise that the analysis has been rather similar to that of the spherical pendulum. Let’s continue following that path. Since , Noether tells us that energy is conserved and
(2.113) |
is constant throughout the motion. We can use this fact to “reduce to quadrature”,
(2.114) |
Up to this point the analysis is for an arbitrary potential . At this point let’s specialise to the case of two bodies interacting gravitationally with
(2.115) |
where is Newton’s constant. For this potential, the different solutions were studied in your Part I mechanics course where Kepler’s laws were derived. The orbits fall into two categories: elliptic if and hyperbolic if as shown in figure 15.
It’s worth noting the methodology we used to solve this problem. We started with 6 degrees of freedom describing the positions of two particles. Eliminating the centre of mass reduced this to 3 degrees of freedom describing the separation. We then used conservation of the direction of to reduce to 2 degrees of freedom and ), and conservation of the magnitude of to reduce to a single variable . Finally conservation of allowed us to solve the problem. You might now be getting an idea about how important conservation laws are to help us solve problems!
Consider three masses , and interacting gravitationally. In general this problem does not have an analytic solution and we must resort to numerical methods (i.e. putting it on a computer). However, suppose that and . Then it is a good approximation to first solve for the motion of and interacting alone, and then solve for the motion of in the time dependent potential set up by and . Let’s see how this works.
For simplicity, let’s assume and are in a circular orbit with . We saw in the previous section that the circular orbit occurs for , from which we get an expression relating the angular velocity of the orbit to the distance
(2.116) |
which is a special case of Kepler’s third law. Let’s further assume that moves in the same plane as and (which is a pretty good assumption for the sun-earth-moon system). To solve for the motion of in this background, we use our ability to change coordinates. Let’s go to a frame which rotates with and with the centre of mass at the origin. The particle is a distance from the origin, while is a distance from the origin.
Then, from the example of Section 2.2.1, the Lagrangian for in the rotating frame is
where is the gravitational potential for interacting with and
(2.117) |
The separations are given by
(2.118) |
Be aware that and are the dynamical coordinates in this system, while is the fixed separation between and . The equations of motion arising from are
(2.119) |
The full solutions to these equations are interesting and complicated. In fact, in 1889, Poincaré studied the restricted three-body system and discovered the concept of chaos in dynamical systems for the first time (and, in the process, won 2,500 krona and lost 3,500 krona). We’ll be a little less ambitious here and try to find solutions of the form . This is where the third body sits stationary to the other two and the whole system rotates together. Physically, the centrifugal force of the third body exactly cancels its gravitational force. The equations we have to solve are
(2.120) | |||||
(2.121) |
There are five solutions to these equations. Firstly suppose that so that sits on the same line as and . Then we have to solve the algebraic equation
(2.122) |
In figure 17, we have plotted the LHS and RHS of this equation to demonstrate the three solutions, one in each of the regimes:
In general there are five stationary points drawn in the figure. These are called Lagrange points. It turns out that , and are unstable, while and are stable as long as is sufficiently less than .
For the earth-sun system, NASA and ESA make use of the Lagrange points and to place satellites. There are solar observatories at ; satellites such as WMAP and PLANCK which measure the cosmic microwave background radiation (the afterglow of the big bang) gather their data from . Apparently, there is a large collection of cosmic dust which has accumulated at and . Other planetary systems (e.g. the sun-jupiter and sun-mars systems) have large asteroids, known as trojans, trapped at their and .
Often in physics, one is interested in systems with only kinetic energy and no potential energy. For a system with dynamical degrees of freedom , , the most general form of the Lagrangian with just a kinetic term is
(2.126) |
The functions depend on all the generalised coordinates. Assume that so that the inverse matrix exists (). It is a short exercise to show that Lagrange’s equation for this system are given by
(2.127) |
where
(2.128) |
The functions define a metric on the configuration space, and the equations (2.127) are known as the geodesic equations. They appear naturally in General Relativity where they describe a particle moving in curved spacetime. Lagrangians of the form (2.126) also appear in many other areas of physics, including the condensed matter physics, the theory of nuclear forces and string theory. In these contexts, the systems are referred to as sigma models.
We saw from the beginning that the Lagrangian formulation works with conservative forces which can be written in terms of a potential. It is no good at dealing with friction forces which are often of the type . But there are other velocity dependent forces which arise in the fundamental laws of Nature. It’s a crucial fact about Nature that all of these can be written in Lagrangian form. Let’s illustrate this in an important example.
Recall that the electric field and the magnetic field can be written in terms of a vector potential and a scalar potential
(2.129) |
Let’s study the Lagrangian for a particle of electric charge of the form,
(2.130) |
The momentum conjugate to is
(2.131) |
Notice that the momentum is not simply ; it’s modified in the presence of electric and magnetic fields. Now we can calculate Lagrange’s equations
(2.132) |
To disentangle this, let’s work with indices on the Cartesian coordinates, and rewrite the equation of motion as
(2.133) |
Now we use our definitions of the and fields (2.129) which, in terms of indices, read
(2.134) |
The last of these can be equivalently written as . The equation of motion then reads
or, reverting to vector notation,
(2.135) |
which is the Lorentz force law.
(2.136) |
These give the same and fields for any function . This is known as a gauge transformation. Under this change, we have
(2.137) |
but we know that the equations of motion remain invariant under the addition of a total derivative to the Lagrangian. This concept of gauge invariance underpins much of modern physics. You can learn more about this in the lectures on Electromagnetism.
“Physics is that subset of human experience which can be reduced to coupled harmonic oscillators”
Michael Peskin
Peskin doesn’t say this to knock physics. He’s just a fan of harmonic oscillators. And rightly so. By studying the simple harmonic oscillator and its relatives in ever more inventive ways we understand why the stars shine and why lasers shine and, thanks to Hawking, why even black holes shine.
In this section we’ll see one reason why the simple harmonic oscillator is so important to us. We will study the motion of systems close to equilibrium and see that the dynamics is described by decoupled simple harmonic oscillators, each ringing at a different frequency.
Let’s start with a single degree of freedom . We’ve already seen several examples where we get an equation of the form
(2.138) |
An equilibrium point, , of this system satisfies . This means that if we start with the initial conditions
(2.139) |
then the system will stay there forever. But what if we start slightly away from ? To analyse this, we write
(2.140) |
where is assumed to be small so that we can Taylor expand to find
(2.141) |
and we neglect the terms quadratic in and higher. There are two possible behaviours of this system
. In this case the restoring force sends us back to and the solution is
(2.142) |
where and are integration constants, while . The system undergoes stable oscillations about at frequency .
. In this case, the force pushes us away from equilibrium and the solution is
(2.143) |
where and are integration constants, while . In this case, there is a very special initial condition such that at late times. But for generic initial conditions, gets rapidly large and the approximation that is small breaks down. We say the system has a linear instability.
Now let’s generalise this discussion to degrees of freedom with equations of motion of the form,
(2.144) |
An equilibrium point must satisfy for all . Consider small perturbations away from the equilibrium point
(2.145) |
where, again, we take the to be small so that we can Taylor expand the , and neglect the quadratic terms and higher. We have
(2.146) |
where the sum over is implicit. It’s useful to write this in matrix form. We define the vector and the matrix as
(2.147) |
where each partial derivative in the matrix is evaluated at . The equation now becomes simply
(2.148) |
Our strategy is simple: we search for eigenvectors of . If were a symmetric matrix, it would have a complete set of orthogonal eigenvectors with real eigenvalues. Unfortunately, we can’t assume that is symmetric. Nonetheless, it is true that for equations of the form (2.148) arising from physical Lagrangian systems, the eigenvalues will be real. We shall postpone a proof of this fact for a couple of paragraphs and continue under the assumption that has real eigenvalues. In general, will have different left and right eigenvectors,
(2.149) |
where there’s no sum over in these equations. The left and right eigenvectors satisfy . Note that although the eigenvectors differ, the eigenvalues for are the same. Although are real for the physical systems of interest (to be proved shortly) they are not always positive. The most general solution to is
(2.150) |
where and are integration constants. Again, we have two possibilities for each eigenvalue
In this case for some real number . The system will be stable in the corresponding direction .
. Now are real and the system exhibits a linear instability in the direction
The eigenvectors are called normal modes. The equilibrium point is only stable if for every . If this is the case the system will typically oscillate around the equilibrium point as a linear superposition of all the normal modes, each at a different frequency.
To keep things real, we can write the most general solution as
(2.151) |
where now and are the integration constants.
Finally, let’s show what we put off above: that the eigenvalues are real for matrices derived from a physical Lagrangian system. Consider a general Lagrangian of the form,
(2.152) |
We will require that is invertible and positive definite for all . Expanding about an equilibrium point as in (2.145), to linear order in the equations read
(2.153) |
where and , evaluated at . Then in the matrix notation of (2.148), we have . Both and are symmetric, but not necessarily simultaneously diagonalisable. This means that is not necessarily symmetric. Nevertheless, does have real eigenvalues. To see this, look at
(2.154) |
So far, both and could be complex. We will now show that they’re not. Take the inner product of this equation with the complex conjugate eigenvector . We have . But for any symmetric matrix , the quantity is real. (This follows from expanding in the complete set of real, orthogonal eigenvectors of , each of which has a real eigenvalue). Therefore both and are both real. Since we have assumed that is invertible and positive definite, we know that so, from (2.154), we conclude that the eigenvalue is indeed real.
In section 2.5.2, we derived the Lagrangian for the double pendulum. Restricting to the case where the two masses are the same and the two lengths are the same , we derived the Lagrangian (2.97) for arbitrary oscillations
The stable equilibrium point is clearly . (You could check mathematically if you’re dubious). Let’s expand for small and . If we want to linearise the equations of motion for , then we must expand the Lagrangian to second order (so that after we take derivatives, there’s still a left standing). We have
(2.155) |
where we’ve thrown away an irrelevant constant. From this we can use Lagrange’s equations to derive the two linearised equations of motion
(2.156) |
Or, writing , this becomes
(2.157) |
We have two eigenvectors. They are
which has eigenvalue . This corresponds to the motion shown in figure 19 for the first normal mode.
which has eigenvalue . This corresponds to the motion shown in figure 19 for the second normal mode.
We see that the frequency of the mode in which the two rods oscillate in different directions should be higher than that in which they oscillate together.
Consider the molecule drawn in the figure. It’s a rough approximation of . We’ll only consider motion in the direction parallel to the molecule for each atom, in which case the Lagrangian for this object takes the form,
(2.158) |
The function is some rather complicated interatomic potential. But, the point of this section is that if we’re interested in oscillations around equilibrium, this doesn’t matter. Assume that in equilibrium. By symmetry, we have . We write deviations from equilibrium as
(2.159) |
Taylor expanding the potential about the equilibrium point,
(2.160) |
Here the first term is a constant and can be ignored, while the second term vanishes since we are in equilibrium. Substituting into the Lagrangian, we have
(2.161) |
where evaluated at . Then the equations of motion are
(2.162) |
or, putting it in the form , we have
(2.163) |
Again, we must look for eigenvectors of . There are three:
which has eigenvalue . But this is just an overall translation of the molecule. It’s not an oscillation.
which has eigenvalue . In this motion, the outer two atoms oscillate out of phase, while the middle atom remains stationary. The oscillation has frequency .
which has eigenvalue . This oscillation is a little less obvious. The two outer atoms move in the same direction, while the middle atom moves in the opposite direction. The frequency of this vibration is greater than that of the second normal mode.
All motions are drawn in figure 21. For small deviations from equilibrium, the most general motion is a superposition of all of these modes.
(2.164) |