Abstract
ABSTRACTA brief discussion is given of attempts that have been made to justify, in terms of electrostatic principles, the conjecture that surface charge on a conductor tends to infinity towards a convex sharp point and to zero towards a concave point, and it is concluded that the problem has not hitherto been solved. A new attempt is then made using potential-theoretic methods, and the problem is solved with a fair degree of generality. The limitations are of a kind familiar in this type of analysis and, roughly speaking, concern the degree of convexity of the conducting surface.
Publisher
Cambridge University Press (CUP)
Cited by
4 articles.
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1. Electric Field Optimization of High Voltage Electrode;2023 Seminar on Fields, Waves, Photonics and Electro-optics: Theory and Practical Applications (FWPE);2023-11-21
2. Conductor curvature and surface charge density;Journal of Physics D: Applied Physics;1990-03-14
3. An existence theorem for Robin's equation;Mathematical Proceedings of the Cambridge Philosophical Society;1972-11
4. Numerical Calculation of Certain Small Electrostatic Effects;Journal of Applied Physics;1958-01