Milestones:Maxwell's Equations, 1860-1871

Revision as of 16:53, 18 August 2009 by Administrator4 (talk | contribs)

Maxwell’s Equations, 1860-1871

Between 1860 and 1871, at his family home Glenlair and at King’s College London, where he was Professor of Natural Philosophy, James Clerk Maxwell conceived and developed his unified theory of electricity, magnetism and light. A cornerstone of classical physics, the Theory of Electromagnetism is summarized in four key equations that now bear his name. Maxwell’s equations today underpin all modern information and communication technologies.

Image:Maxwell_equations.jpg 

James Clerk Maxwell began his first serious work on electromagnetism when he was a Fellow at Cambridge University, 1854 – 1856. From 1860 – 1865 he was a Professor at King’s College London, during which time he did some key experiments at the College and at his residence in Kensington. He began to spend his summers at Glenlair, where he also conducted experiments. During his tenure at King’s College, he published his two most important papers on electromagnetic theory: “On Physical Lines of Force” (1861), which added a critical correction to Ampère's circuital law; and “A Dynamical Theory of the Electromagnetic Field” (1865), which proposed light as an electromagnetic wave. In both cases he pioneered the use of mathematics in describing the behavior of light. From 1865 – 1871, Maxwell lived full-time at Glenlair as an independent scholar, during which time he wrote his magnum opus, Treatise on Electricity and Magnetism (published in 1873), which summarized all of the known theory of electromagnetism, including his own contributions. We specify the dates 1860 –1871 for the Milestone- this covers Maxwell’s time at King’s College London and subsequently Glenlair, during which time Maxwell published the two key papers on the theory of electromagnetism, and wrote the Treatise.


Maxwell deduced that light was an electromagnetic wave, thus revolutionizing the fields of
electrical science and electrical engineering. He pioneered the use of calculus in
electromagnetic science and independently derived three of the four modern equations that
now bear his name. These are Gauss’s Law, Gauss’s Law for Magnetism, and Ampere’s
Law withMaxwell’s correction, and appear in their original scalar form at equations (115),
(56) and (112) in his 1861 paper On Physical Lines of Force. In this paper he also derived a
full-time-derivative version of Faraday’s Law (at equations (54) and (77)), which is a more
general version of the fourth modern Maxwell equation. Equation (77) additionally
includes a term for the Lozentz Force, predating the work of Lorentz. The correction to
Ampere’s Circuital Law introduced the electric displacement current, which ultimately
enabled his derivation of the electromagnetic wave equation in his 1865 paper A Dynamical
Theory of the Electromagnetic Field. In the 1873 Treatise on Electricity and Magnetism,
Maxwell introduced a condensed, vector form of the equations in quaternion notation
(Volume 2, chapter IX General Equations of the Electromagnetic Field). These included the
vector fields E, B, D and H and vector potential A as are used today (albeit originally
written in German Script).
It was Oliver Heaviside who subsequently introduced the fourth modernMaxwell equation
as a partial-time-derivative version of Faraday’s Law, and recast the equations derived by
Maxwell in their well-known vector calculus form, but he acknowledged that it was
Maxwell who did the original work. Albert Einstein specifically acknowledged the
importance of Maxwell in his development of special relativity. It was apparently Einstein
who originally referred to them as “Maxwell’s Equations,” and this is the way they are
known to the broader public, hence the proposed name of theMilestone.


The plaques may be visited at

Glenlair,                                                             King’s Building,
Knockvennie,                                                      Strand Campus,
Castle Douglas,                                                  King's College London,
Kirkcudbrightshire,                                               London WC2R 2LS
DG7 3DF UK
UK