My Physics teacher was reluctant to define Lagrangian as Kinetic Energy minus Potential Energy because he said that there were cases where a system's Lagrangian did not take this form. Are you are aware of any such examples?
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For a relativistic free particle you would think that the Lagrangian would be like $$ L = T = (\gamma -1)mc^2 $$ This is not the case, it is $$ L = -\gamma^{-1}mc^2 $$ These two functions look like
and are not the same. This choice of kinetic term gives a canonical momentum of $p=\gamma mv$. |
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The action integral can be in "Jacobi action" form, which looks like: $$ S = 2\int^{B}_{A}\sqrt{(E-V)T}\,\mathrm{d}t $$ where usually $E$ is constant, $V=V(x)$ is the potential energy, and $T=2m$ is the kinetic energy. For more on this, see:
There are many other versions for deriving the equations of motion from variational calculus, see:
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As far as I know, in classical mechanics $L$ is defined exactly as difference between kinetic and potential energy. Conversely, it's the Hamiltonian that not alway equals $T+U$, and should be defined as as Legendre transform of Lagrangian. In more complicated models, as in field theory, the Lagrangian could be more complicated. This is because Lagrangians, as Hamiltonian operators in quantum mechanics, are not determined by a universal rule or by a theorem. They are chosen only because they work, i.e. because of an analogy with classical mechanics, or because they lead to physically verified Euler equations. In this case, there is no special reason for which a lagrangian should be separable in two distinct $U$ and $T$ terms. |
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In one of his classical mechanics lectures (I believe the latest set), Leonard Susskind answered a similar question by saying (and I cannot directly quote because I don't have the video in front of me) that Lagrangians are simply functions that lead to the correct equations of motion. I will add that those equations of motion can be solved and the resulting behavior compared to Nature as a test of correctness. Susskind went on to day that there is no rule that a system's Lagrangian must be T - U and that there can be "cross terms" that describe certain interactions. He went further to say something that really stuck with me, and that is when we're learning calculus, we never ask, "From where do we get the functions that we're learning to analyze?" We basically make them up or guess them or deduce them from observed behaviors (in physics, anyway). That statement seemed rather profound to me. |
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Definition of the lagrangian functionAccording to Landau-Lifchitz course, the definition of the least action principle contains two substantial points.
Between those two points the motion is made such as the integral of the lagrangian function between those two instants is minimum. From there you can get the Lagrange's equation. Nothing is said about $L = T-U$. Expression of the lagrangian for a free particleConsidering a free material point we choose to describe the motion in a well specific kind of frame. A frame where the space can be considered homogeneous, isotropic and where the time uniform seems to be the wisest choice. Assuming such a frame exists (it is called a galilean frame of reference) what would be the form of the lagrangian? Because the space is homogeneous the lagrangian can't contain any term involving the generalized coordinates. In other words the laws of motion cannot depend on where the system actually is. Because the time is also homogeneous, we get the same conclusion, the time cannot explicitly appear in the lagrangian. The space is also isotropic, it means that the laws of motion cannot depend on the direction of the motion in the space. Then the lagrangian only depends on the norm of the speed and thus not on the direction of the speed vector. Then the lagrangian function only depends on the absolute value of the speed or on the square of the speed vector. $L = a v^2$. If you put this form in the Lagrange equation's you'll get that $v^2$ is a constant independent of time. Then you obtain the first Newton's law. Pursuing the reasoning with the study of two galilean frames moving from one to another will end on L proportional to the square of speed. General expression of the lagrangianConsider an isolated system constituted of several particles. You can discribe the interactions between all particles with a function that depends on the position of each particle only. You can call this function $-U$. It's important to see why this function cannot depend on time. In classical mechanics we consider that the interaction propagates itself instantaneously from one particle to another. Then the time cannot explicitly appear int this -U function. Hence the general form of the lagrangian function is $L = T-U$. Using the uniformity of time and Lagrange's equations you will be able to find that a certain quantity doesn't depend on time : $$ E=\sum_i \dot{q_i} \frac{\partial L}{\partial \dot{q_i}} - L $$ Using the form $T-U$ of the lagrangian, the above relation and the Euler's homogeneous function theorem you will get : $$ E = T + U $$ Now, and only now, you can say that the total energy of the motion is the sum of two distinct terms. The first one doesn't depends on velocity and is called kinetic energy. The second term only depends on position and it is called potential energy. |
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To derive the field equations of general relativity (in vacuum), the Lagrangian density is simply the Ricci scalar, which measures deviations from flat space-time. This is a good example of a Lagrangian that has no real "energy" interpretation: in vacuum there is clearly no energy in classical mechanics! |
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