Abstract
Taylor's asymptotic analysis theory is used to design the generalized Taylor and Bayliss patterns. Such a design technique allows generating array factors with arbitrary sidelobe level and envelope taper. For both the Taylor and Bayliss patterns, array excitation is obtained by the Elliott's pattern zero matching technique. A few examples are provided to validate the presented theory. Also, variation of different array characteristics with respect to the sidelobe tapering is explained through graphical data.
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