This paper puts forth the notion that explicitly specified transition bands have been introduced in the filter design literature in part as an indirect approach for dealing with discontinuities in the desired frequency response. We suggest that the use of explicitly specified transition bands is sometimes inappropriate because to satisfy a meaningful optimality criterion, their use implicitly assumes a possibly unrealistic assumption on the class of input signals. This paper also presents an algorithm for the design of peak constrained lowpass FIR filters according to an integral square error criterion that does not require the use of specified transition bands. This rapidly converging, robust, simple multiple exchange algorithm uses Lagrange multipliers and the Kuhn-Tucker conditions on each iteration. The algorithm will design linear- and minimum-phase FIR filters and gives the best L/sub 2/ filter and a continuum of Chebyshev filters as special cases. It is distinct from many other filter design methods because it does not exclude from the integral square error a region around the cut-off frequency, and yet, it overcomes the Gibbs' phenomenon without resorting to windowing or 'smoothing out' the discontinuity of the ideal lowpass filter.
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机译:本文提出了这样的概念,即在滤波器设计文献中引入了明确指定的过渡带,部分将其作为处理所需频率响应中不连续性的间接方法。我们建议使用明确指定的过渡带有时是不合适的,因为要满足有意义的最优性标准,它们的使用会隐含地假设对输入信号的类别可能不切实际的假设。本文还提出了一种根据积分平方误差准则设计峰值约束低通FIR滤波器的算法,该准则不需要使用指定的过渡频带。这种快速收敛,健壮,简单的多重交换算法在每次迭代中使用拉格朗日乘数和Kuhn-Tucker条件。该算法将设计线性和最小相位FIR滤波器,并在特殊情况下提供最佳的L / sub 2 /滤波器和连续的切比雪夫滤波器。它与许多其他滤波器设计方法不同,因为它没有从积分平方误差中排除截止频率附近的区域,但是它克服了吉布斯现象,而无需求助于开窗或“消除”噪声的不连续性。理想的低通滤波器。
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