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James Clerk Maxwell: a birthday

Off-topic, geology: The world ocean may have just quadrupled. A Science article brings evidence that at the depth of 410-660 km, there is a huge amount of so far overlooked water hiding in ringwoodite, a sponge-like stone, whose volume is 3 times the surface oceans' combined.
James Clerk Maxwell was born on June 13th, 1831, i.e. 183 (similar digits) years ago, which was fortunately for him Monday and not Friday we have today ;-), to a wealthy advocate from a family of Conservative Party lawmakers, and he died on November 5, 1879 (deja vu without MathJax). He was probably the most influential 19th century string theorist even though he mostly cared about the low-energy limit, similarly to the supergravity theorists today.

Most science historians are secular progressives so they won't tell you that Maxwell, much like both of his parents, was actually a devout Christian throughout his life. He was also a poet, singer, and guitar player. The following lyrics by Maxwell became immortal:
Gin a body meet a body
Flyin' through the air.
Gin a body hit a body,
Will it fly? And where?

Maxwell developed the kinetic theory of gases - we learn about the Maxwell-Boltzmann distribution that we know to be the zero-mode part of the string-theoretical thermal path integral. ;-) He also discovered some optical properties of anisotropic solids and took the first permanent color photograph in 1861:

Field theory

Needless to say, his most important discovery is classical electromagnetism. He built on previous work by Michael Faraday. Because this is a physics blog, let us recall Maxwell's equations:
\[ \eq{ \nabla\cdot \vec D &= \rho\\
\nabla\times \vec H &= \vec J + \frac{\partial \vec D}{\partial t}\\
\nabla\cdot \vec B &= 0\\
\nabla\times \vec E &=- \frac{\partial \vec B}{\partial t}
For simplicity, assume that \(\vec D=\vec E\) and \(\vec B=\vec H\) to avoid complications associated with non-trivial materials. It was Lorentz who realized that there only exists one fundamental electric and one fundamental magnetic vector at each point of space and time but let us adopt this modern perspective anyway.

It might be useful to describe the alternative names of these four equations. The first equation is Gauss' law: the electric flux through a surface equals the charge inside. The second equation has somewhat more complex history that we will discuss later.

The third equation is Gauss' law for magnetism, assuming that magnetic monopoles are absent. (We are confident that in principle, magnetic monopoles should exist and GUT theories and most string vacua generally predict them; but the lightest magnetic monopole is a very heavy, nearly Planckian, elementary particle.) The fourth equation equation is Faraday's law of electromagnetic induction: the electric field can almost be calculated from a potential except that if the magnetic flux through a curve is changing, the contour integral of the electric field around the curve is equal to the negative time derivative of the flux.

The second equation is Ampére's circuital law and it is analogous to the fourth equation discussed above. So it seems that the equations are due to Gauss, Ampére, Gauss, and Faraday. So why do we talk about Maxwell at all? ;-) Well, Maxwell has added the time derivative of \(\vec D\) into the second, Ampére's equation: it is the Maxwell current. He was almost certainly led by aesthetics - namely by S-duality, using the current stringy jargon. Except for the non-existent (well, so far unobserved) magnetic monopoles, the equations seem to display a symmetry between the electric and magnetic phenomena and effects.

This single term had far-reaching consequences. Maxwell could suddenly solve his equations in many situations. The vacuum was the most important application. He found out that his equations admit wave-like solutions, the electromagnetic waves. All electromagnetic coefficients were known so he could calculate the speed of these waves. His result was \(1.03\) times the speed of light. But because it was compatible with the speed of light measured by experimenters at that time, Maxwell could end up with the bold conclusion that light itself was an example of electromagnetic wave.

Maxwell triumphally unified electricity, magnetism, and light.

Among the 19th century developments, his discovery was probably the most influential from a 20th century perspective.

However, Maxwell couldn't imagine that the waves exist in the vacuum. Because sound needs air or another environment to propagate, Maxwell needed to envision a material supporting the electromagnetic waves, too. It was the infamous luminiferous aether. It is amazing that such a religious person who should have no difficulty with imagining some mathematical ghosts that simply live in an empty space had to think about such a naive, materialistic substance made out of atoms.

Well, even great physicists who believe in a perfect God may turn out to be imperfect themselves.

20th century repercussions

Electromagnetism and its predicted constancy and reference-frame-independence of the vacuum speed of light - something that seems to contradict the usual rules of Newton's mechanics - became one of the main driving forces behind Einstein's discovery of special relativity. His equations started to be quantized in the late 1920s and led to the development of quantum electrodynamics, QED.

Electromagnetism is by far the most important force behind chemistry, biology, and modern technology. Because of its infinite range combined with a relatively high characteristic strength whose dimensionless parameter (the fine-structure constant) is nevertheless much smaller than one, electromagnetism remains the most accurately understood and measured force. It will almost certainly remain the most accurately measured fundamental force forever.

Just like symmetries and kinematics of Maxwell's equations led Einstein to special relativity, their dynamics inspired Einstein when he was developing general relativity. General relativity is just another field theory, adding some new subtleties to Maxwell's conceptual framework, and the same comment applies to other (weak and strong nuclear) forces - that can be described by Yang-Mills fields.

It's not hard to see why even though Maxwell only added one term to an equation, if we tried to be very modest, Einstein considered him as the greatest scientist after Newton. From our modern perspective, Maxwell's discoveries were about simple examples of Abelian Yang-Mills fields, i.e. a \(U(1)\) gauge theory. But this theory is crucially important for the world around us and it is also important theoretically because \(U(1)\) gauge fields occur in most backgrounds of string theory and may emerge by spontaneous symmetry breaking of non-Abelian fields, as dual description of non-Abelian fields, and in many other ways.

The final classical theory of electromagnetism is far from being Maxwell's only contribution to physics. Read about exorcising Maxwell's daemons, one dozen (exactly) of blog posts mentioning the full name of James Clerk Maxwell, and 100 blog posts (exactly) mentioning Maxwell in any form.

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snail feedback (9) :

reader NikFromNYC said...

YouTube is now immediately blocking even fair use snippets of documentaries. Let's try TinyPic.... It's James Burke on Maxwell's equations.

reader Eelco Hoogendoorn said...

Good tribute to a great scientist. My only objection is the use of vector calculus. My favorite equation in all of science is maxwells equations expressed in exterior calculus. How beautiful is it that such a fundamental equation can be described with a single differential operator? And it isn't a case of lots of complexity hidden behind a single cryptic symbol, as can often be the case with mathematics; the exterior derivative is really where calculus 101 should start, because the concept really couldn't be any simpler. Maxwell equation truely is the simplest wave equation that may exist in a 3+1 spacetime.

reader scooby said...

And you don't even need LaTeX!
dF = 0, d*F = 0 (or d*F = J).

reader kashyap vasavada said...

Are you talking about tensor formulation or something else? If it is some thing other than tensor formulation, can you give reference (preferably on line) on exterior derivative?

reader Will Janoschka said...

Go back to Maxwell's quarterion equations, then you can convert to a vector between any two points, not just from one origin. Computationaly fast.

reader NikFromNYC said...

Quite a conspiracy theory has attached to different formulations, linked to the business war between Edison and Tesla.

reader NikFromNYC said...

Why is the Universe everywhere chiral so that moving a magnet through a ring of wire is forever linked to a right hand rule direction of induced current?

reader scooby said...

reader Eelco Hoogendoorn said...

Wikipedia even has a subsection for it :). Im referring to the differential form formulation.
The discrete implementation of such electromagnetic differential forms is amazingly simple in particular; but I cant say more or else lubbos will ban me for the spreading of heretical discrete propaganda.