Elementary Edge Waves and the Physical Theory of Diffraction

ABSTRACT A more general and rigorous form of the physical theory of diffraction (PTD) is presented. This theory is concerned with the field scattered by perfectly conducting bodies whose surfaces have sharp edges and whose linear dimensions and curvature radii are large in comparison with a wavelength. The PTD proposed here is based on the conception of elementary edge waves (EEWs). These are the waves scattered by the vicinity of an edge infinitesimal element. Their high-frequency asymptotics are given. Various definitions of EEWs (Maggi, Bateman, Rubinowicz, Mitzner, Michaeli) are discussed. Total edge waves (TEWs) scattered by the whole edge are found to be a linear superposition of all EEWs. PTD enables one to determine correctly the first (leading) term in the high-frequency asymptotic expansions for primary and multiple TEWs both in ray regions and diffraction regions such as caustics, shadow boundaries, and focal lines. Some examples of these asymptotics are given. The connection of PTD with other ...

[1]  Makoto Ando,et al.  Radiation pattern analysis of reflector antennas , 1985 .

[2]  A. Michaeli Elimination of infinities in equivalent edge currents, Part II: Physical optics components , 1986 .

[3]  Graeme L. James,et al.  Geometrical Theory of Diffraction for Electromagnetic Waves , 1980 .

[4]  Donald Ludwig,et al.  Uniform asymptotic expansions at a caustic , 1966 .

[5]  J. Keller,et al.  Geometrical theory of diffraction. , 1962, Journal of the Optical Society of America.

[6]  A. Rubinowicz,et al.  Die Beugungswelle in der Kirchhoffschen Theorie der Beugungserscheinungen , 1917 .

[7]  R. F. Millar An Approximate Theory of the Diffraction of an Electromagnetic Wave by an Aperture in a Plane Screen , 1956 .

[8]  Shung-wu Lee Comparison of uniform asymptotic theory and Ufimtsev's theory of electromagnetic edge diffraction , 1977 .

[9]  Pyotr Ya. Ufimtsev,et al.  Theory of acoustical edge waves , 1989 .

[10]  W. Burnside,et al.  First-order equivalent current and corner diffraction scattering from flat plate structures , 1983 .

[11]  A. Michaeli Equivalent currents for second-order diffraction by the edges of perfectly conducting polygonal surfaces , 1987 .

[12]  Johannes J. Duistermaat,et al.  Oscillatory integrals, lagrange immersions and unfolding of singularities , 1974 .

[13]  F. Kottler Elektromagnetische Theorie der Beugung an schwarzen Schirmen , 1923 .

[14]  Comments on "Equivalent currents for a ring discontinuity" , 1974 .

[15]  P. Balling,et al.  Caustics and caustic corrections to the field diffracted by a curved edge , 1977 .

[16]  J. Boersma,et al.  Three-dimensional half-plane diffraction: Exact solution and testing of uniform theories , 1984 .

[17]  Y. Kravtsov,et al.  Caustics, Catastrophes and Wave Fields , 1993 .

[18]  D. S. Ahluwalia,et al.  Uniform Asymptotic Theory of Diffraction by the Edge of a Three-Dimensional Body , 1970 .

[19]  A. Michaeli,et al.  A closed form physical theory of diffraction solution for electromagnetic scattering by strips and 90° dihedrals , 1984 .

[20]  G. Deschamps,et al.  A uniform asymptotic theory of electromagnetic diffraction by a curved wedge , 1976 .

[21]  J Joop Boersma,et al.  Uniform Asymptotic Theory of Diffraction by a Plane Screen , 1968 .

[22]  G. Maggi Sulla propagazione libera e perturbata delle onde luminose in un mezzo isotropo , 1888 .

[23]  C. Chester,et al.  An extension of the method of steepest descents , 1957, Mathematical Proceedings of the Cambridge Philosophical Society.

[24]  A. Michaeli A new asymptotic high‐frequency analysis of electromagnetic scattering by a pair of parallel wedges: Closed form results , 1985 .

[25]  L. Peters,et al.  Evaluation of edge-diffracted fields including equivalent currents for the caustic regions , 1969 .

[26]  P.Ya. Ufimtsev,et al.  Comments on "Comparison of three high-frequency diffraction techniques" , 1975 .

[27]  Thomas B. A. Senior,et al.  Comparison of three high-frequency diffraction techniques , 1974 .

[28]  W. Burnside,et al.  Axial‐Radar Cross Section of Finite Cones by the Equivalent‐Current Concept with Higher‐Order Diffraction , 1972 .

[29]  A. Michaeli Equivalent edge currents for arbitrary aspects of observation , 1984 .

[30]  K. Westpfahl,et al.  Zur Theorie einer Klasse von Beugungsproblemen mittels singulärer Integralgleichungen. V Hochfrequenz-Beugung ebener elektromagnetischer Wellen an einer ideal leitenden Kreisblende†‡ , 1971 .

[31]  A. Rubinowicz,et al.  Zur Kirchhoffschen Beugungstheorie , 1924 .

[32]  R. Kouyoumjian,et al.  A uniform geometrical theory of diffraction for an edge in a perfectly conducting surface , 1974 .

[33]  A. Michaeli Elimination of infinities in equivalent edge currents, part I: Fringe current components , 1986 .

[34]  E. Knott A progression of high-frequency RCS prediction techniques , 1985, Proceedings of the IEEE.

[35]  K M Mitzner,et al.  Incremental Length Diffraction Coefficients , 1974 .

[36]  Uniform Asymptotic Theory of Diffraction by a Finite Cylinder , 1979 .