• Title of article

    Low-pass filter design using locally weighted polynomial regression and discrete prolate spheroidal sequences

  • Author/Authors

    Proietti، نويسنده , , Tommaso and Luati، نويسنده , , Alessandra، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2011
  • Pages
    15
  • From page
    831
  • To page
    845
  • Abstract
    The paper concerns the design of nonparametric low-pass filters that have the property of reproducing a polynomial of a given degree. Two approaches are considered. The first is locally weighted polynomial regression (LWPR), which leads to linear filters depending on three parameters: the bandwidth, the order of the fitting polynomial, and the kernel. We find a remarkable linear (hyperbolic) relationship between the cut-off period (frequency) and the bandwidth, conditional on the choices of the order and the kernel, upon which we build the design of a low-pass filter. cond hinges on a generalization of the maximum concentration approach, leading to filters related to discrete prolate spheroidal sequences (DPSS). In particular, we propose a new class of low-pass filters that maximize the concentration over a specified frequency range, subject to polynomial reproducing constraints. The design of generalized DPSS filters depends on three parameters: the bandwidth, the polynomial order, and the concentration frequency. We discuss the properties of the corresponding filters in relation to the LWPR filters, and illustrate their use for the design of low-pass filters by investigating how the three parameters are related to the cut-off frequency.
  • Keywords
    low-pass filters , Concentration , Filter design , Kernels
  • Journal title
    Journal of Statistical Planning and Inference
  • Serial Year
    2011
  • Journal title
    Journal of Statistical Planning and Inference
  • Record number

    2221180