Title :
Waveguide circuits with nearly arbitrary cross-sections
Author :
Marquardt, Jürgen ; Schneider, Martin
Author_Institution :
Inst. fur Hochfrequenztech., Hannover Univ., Germany
Abstract :
A new method is presented to compute the eigenmodes of rectangular waveguides with rounded corners. The boundary condition, the trigonometric and the Bessel functions in the solution of the wave-equation are all expanded in a Fourier series. The products of these series are reduced by convolution to a single series of periodic functions, which represents the eigenmodes. The coupling between subsequent sections of such waveguides is calculated by the mode-matching method. This leads to the design of optimized transitions of short length between rather different waveguides. Examples show excellent agreement between simulation and measurement
Keywords :
Bessel functions; Fourier series; S-parameters; convolution; eigenvalues and eigenfunctions; mode matching; rectangular waveguides; wave equations; waveguide theory; waveguide transitions; Bessel functions; Fourier series; arbitrary cross-sections; boundary condition; convolution; eigenmodes; mode-matching method; optimized transitions; periodic functions; rectangular waveguides; rounded corners; trigonometric functions; wave-equation; waveguide circuits; Boundary conditions; Convolution; Coupling circuits; Fourier series; Milling; Mode matching methods; Partial differential equations; Rectangular waveguides; Telecommunication computing; Waveguide transitions;
Conference_Titel :
Microwave and Millimeter Wave Technology Proceedings, 1998. ICMMT '98. 1998 International Conference on
Conference_Location :
Beijing
Print_ISBN :
0-7803-4308-5
DOI :
10.1109/ICMMT.1998.768349
