Advanced Theory of the Diffraction by a Semi-infinite Impedance Cone (Hardback)
  • Advanced Theory of the Diffraction by a Semi-infinite Impedance Cone (Hardback)
zoom

Advanced Theory of the Diffraction by a Semi-infinite Impedance Cone (Hardback)

(author)
£59.95
Hardback 170 Pages / Published: 30/09/2014
  • We can order this

Usually dispatched within 2 weeks

  • This item has been added to your basket
The mathematical problem concerning the diffraction by a semi-infinite cone with circular cross section for the Helmholtz equation, which has well-known solutions for Dirichlet and Neumann boundary conditions, is here considered for the more general boundary condition of constant impedance type. As previously stated by D.S. Jones, the problem then changes in complexity, beginning with the difficulty of obtaining the uniqueness of the solution. An exact analytical method is developed to reduce this problem to the determination of the solution of a well-posed non-oscillatory integral equation, of which the solution can be directly used to express the field in an integral form. Some generalization, in particular to the electromagnetic case, are also given.

Publisher: Alpha Science International Ltd
ISBN: 9781842657768
Number of pages: 170
Dimensions: 240 x 160 x 17 mm

You may also be interested in...

Bright Earth
Added to basket
£14.99
Paperback
Principles of Optics
Added to basket
£55.99
Hardback
Eye of the Beholder
Added to basket
Schrodinger's Kittens
Added to basket
Reading Through Colour
Added to basket
Brilliant
Added to basket
£12.00
Paperback
Optics For Dummies
Added to basket
Fundamentals for Molecular Spectroscopy
Added to basket
My First Colours
Added to basket
Light Scattering by Small Particles
Added to basket
How the Ray Gun Got Its Zap
Added to basket
Invisible
Added to basket
£9.99
Paperback
Optical Resonance and Two-Level Atoms
Added to basket
Quantum Measurement and Control
Added to basket
Atomic Physics
Added to basket
£29.50
Paperback

Reviews

Please sign in to write a review

Your review has been submitted successfully.