Solution of the Plane Wave Diffraction Problem By an Impedance Strip Using a Numerical-Analytical Method: E-Polarized Case

“…It is necessary to add the J (∅) (ρ) arbitrary private solution of the inhomogeneous Equation (7) to the solution of Equation (8) in order to obtain a complete solution of Equation (7). What is more, it is useful that (as parameters) the coordinates of both ends of the monopole will be represented in it.…”

“…However, because of complexity of realization of such modeling these questions are not described very well in the literary sources [1][2][3][4]. What is more, even in these rare papers the simple models (such as electrically short dipoles) are considered as radiators despite that a rather developed theoretical basis exists for the analysis of impedance vibrators [5][6][7][8][9][10][11][12][13][14].…”

Equation Solution for the Current in Radial Impedance Monopole on the Perfectly Conducting Sphere

“…It is necessary to add the J (∅) (ρ) arbitrary private solution of the inhomogeneous Equation (7) to the solution of Equation (8) in order to obtain a complete solution of Equation (7). What is more, it is useful that (as parameters) the coordinates of both ends of the monopole will be represented in it.…”

“…However, because of complexity of realization of such modeling these questions are not described very well in the literary sources [1][2][3][4]. What is more, even in these rare papers the simple models (such as electrically short dipoles) are considered as radiators despite that a rather developed theoretical basis exists for the analysis of impedance vibrators [5][6][7][8][9][10][11][12][13][14].…”

Equation Solution for the Current in Radial Impedance Monopole on the Perfectly Conducting Sphere

“…Veliev et al examined the scattering problem of electromagnetic plane waves by a strip with different face impedances with a hybrid method [6]. Another hybrid method was used by İkiz et al for the impedance strip problem [7]. Imran and Naqvi [8] studied the same problem with the Kobayashi potential method [9].…”

Physical optics theory for the scattering of waves by an impedance strip

“…The investigations of impedance thin vibrators and the systems from them, which had and have wide application in antenna-waveguide engineering (see, for example, [1][2][3][4][5][6][7][8][9][10][11][12][13][14][15][16][17][18]) take a special place among these publications. We should like to note, that new practical applications of vibrator structures are often based on their location in complex electrodynamic environment, which requires taking into account inhomogeneity of medium, boundaries of electrodynamic volumes, presence of vibrators with changing values of surface impedance and so on.…”

Application of the Generalized Method of Induced Emf for Investigation of Characteristics of Thin Impedance Vibrators