On 2-D prony methods
暂无分享,去创建一个
We present: i) an (inner-product based) algebraic framework for using and reunderstanding Prony Spectral Line Estimation (PSLE) methods for sinusoidal fitting to a set of data. ii) an efficient way of applying PSLE to 2-D problems. The main result of i) is that Prony frequencies, rather than be obtained through a polynomial rooting, are obtained by computing the eigenvalues of a tridiagonal matrix. Item ii) will reduce the 2-D PSLE problem to a pair of 1-D PSLE solutions.
[1] S.M. Kay,et al. Spectrum analysis—A modern perspective , 1981, Proceedings of the IEEE.
[2] J. Hudson. On spectrum approximation by impulses , 1982 .
[3] George Cybenko. Fast Approximation of Dominant Harmonics , 1984 .
[4] G. Cybenko. Locations of zeros of predictor Polynomials , 1982 .
[5] Sverre Holm. Spectral moment matching in the maximum entropy spectral analysis method , 1983, IEEE Trans. Inf. Theory.