论文信息 - Some results in linear interpolation theory

Some results in linear interpolation theory

Using a well-known form for the inverse of a symmetric Toeplitz matrix, some results in linear interpolation theory are derived. For an autoregressive process it is shown that interpolation at the mid-point of a data record yields the minimum interpolation error. Also, some results for infinite length interpolators are simply derived.

Steven Kay | S. Kay

[1] Antonio Cantoni,et al. Properties of the Eigenvectors of Persymmetric Matrices with Applications to Communication Theory , 1976, IEEE Trans. Commun..

[2] W. Gabriel. Spectral analysis and adaptive array superresolution techniques , 1980, Proceedings of the IEEE.

[3] Frank K. Soong,et al. Observations on linear estimation , 1978, ICASSP.

[4] M. Morf,et al. Fast time-invariant implementations of Gaussian signal detectors , 1978, IEEE Trans. Inf. Theory.

[5] M. M. Siddiqui. On the Inversion of the Sample Covariance Matrix in a Stationary Autoregressive Process , 1958 .

[6] D. L. Helsey,et al. Linear estimation filters in spectral analysis , 1976, ICASSP.

[7] N. Jayant. Digital coding of speech waveforms: PCM, DPCM, and DM quantizers , 1974 .