• Title of article

    Polynomial Spline-Approximation of Clarke’s Model.

  • Author/Authors

    Y. V. Zakharov، نويسنده , , T. C. Tozer، نويسنده , , and J. F. Adlard، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2004
  • Pages
    11
  • From page
    1198
  • To page
    1208
  • Abstract
    We investigate polynomial spline approximation of stationary random processes on a uniform grid applied to Clarke’s model of time variations of path amplitudes in multipath fading channels with Doppler scattering. The integral mean square error (MSE) for optimal and interpolation splines is presented as a series of spectral moments. The optimal splines outperform the interpolation splines; however, as the sampling factor increases, the optimal and interpolation splines of even order tend to provide the same accuracy. To build such splines, the process to be approximated needs to be known for all time, which is impractical. Local splines, on the other hand, may be used where the process is known only over a finite interval.We first consider local splines with quasioptimal spline coefficients. Then, we derive optimal spline coefficients and investigate the error for different sets of samples used for calculating the spline coefficients. In practice, approximation with a low processing delay is of interest; we investigate local spline extrapolation with a zero-processing delay. The results of our investigation show that local spline approximation is attractive for implementation from viewpoints of both low processing delay and small approximation error; the error can be very close to the minimum error provided by optimal splines. Thus, local splines can be effectively used for channel estimation in multipath fast fading channels.
  • Keywords
    spectralmoments , Multipath fading channel , spline-approximation. , Random process
  • Journal title
    IEEE TRANSACTIONS ON SIGNAL PROCESSING
  • Serial Year
    2004
  • Journal title
    IEEE TRANSACTIONS ON SIGNAL PROCESSING
  • Record number

    403546