Electromagnetic Scattering by Perfectly Conducting Open Surfaces,

Abstract

The behavior of simple layer potentials and their spatial derivatives near the edge of an open surface is analyzed. Conditions are determined on the surface geometry and on the density distributions for which the potentials have locally finite energy. These results are applied to the formulation problems of electromagnetic scattering from open surface as integral equations. It is shown that for certain classes of open surfaces and current densities, the boundary value problem is equivalent to a problem in integral equations of the first kind which can have at most one solution. (Author)

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Document Details

Document Type
Technical Report
Publication Date
Mar 01, 1977
Accession Number
ADA039569

Entities

People

  • John S. Asvestas

Organizations

  • University of Delaware

Tags

Communities of Interest

  • Air Platforms
  • Energy and Power Technologies

DTIC Thesaurus Topics

  • Boundary Value Problems
  • Cartesian Coordinates
  • Coordinate Systems
  • Current Density
  • Differential Equations
  • Electromagnetic Fields
  • Electromagnetic Scattering
  • Electromagnetism
  • Equations
  • Geometry
  • Integral Equations
  • Mathematical Analysis
  • Mathematics
  • New York
  • Theorems
  • Two Dimensional
  • Vector Analysis

Fields of Study

  • Mathematics
  • Physics

Readers

  • Electromagnetic Wave Scattering and Antenna Radiation Engineering
  • Fluid Dynamics.