Some uniqueness theorems for the reduced wave equation /
Leo M. Levine, New York Univesity, Institute of Mathematical Sciences, Division of Electromagnetic Research.

Description

Main Author: Levine, Leo M.
Related Names: United States. Air Force.
New York University. Institute of Mathematical Sciences.
Language(s): English
Published: Washington, D.C. : Mathematics Division, Air Force Office of Scientific Research, 1961.
Subjects: Waves.
Spheres.
Conical bodies.
Vibration.
Electromagnetic waves.
Elasticity.
Mathematical analysis.
Summary: This paper deals with various extensions of the Magnus-Rellich uniqueness theorem for the reduced wave equation in infinite domains. The theorem is extended to cover piecewise smooth boundary surfaces of a general kind, and mixed boundary conditions; no auxiliary "edge conditions" are required at edges or at discontinuities in the boundary conditions - continuity of the wave function in the closure of the domain is sufficient. Another extension treats infinite boundaries; for real values of the propagation constant, these are restricted to surfaces which are (generalized) cones sufficiently far from the origin.
Note: June 1961.
Project No. 47500.
Contract No. AF 49(638)-229.
Research Report No. BR-33.
Physical Description: 96, 2 pages ; 28 cm
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