论文信息 - An efficient maximum entropy technique for 2-D isotropic random fields

An efficient maximum entropy technique for 2-D isotropic random fields

A novel linear maximum-entropy method (MEM) spectral-estimation algorithm for 2-D isotropic random fields is presented. This procedure differs from pervious 2-D MEM algorithms by the fact that maximum advantage is taken of the symmetries implied by isotropy. It is shown that the isotropic MEM problem has a linear solution and that it is equivalent to the problem of constructing the optimal linear filter for estimating the underlying isotropic field at a point on the boundary of a disk of radius R, given noisy measurements of the field inside the disk. A fast algorithm for computing the estimation filter is then used to obtain the MEM spectral estimate.<<ETX>>

Ahmed H. Tewfik | Bernard C. Levy | Alan S. Willsky

[1] S.M. Kay,et al. Spectrum analysis—A modern perspective , 1981, Proceedings of the IEEE.

[2] Eric W. Hansen,et al. Fast Hankel transform algorithm , 1985, IEEE Trans. Acoust. Speech Signal Process..

[3] D. Mook,et al. An algorithm for the numerical evaluation of the Hankel and Abel transforms , 1983 .

[4] Walter Rudin,et al. An extension theorem for positive-definite functions , 1970 .

[5] A. Willsky,et al. An eigenstructure approach for the retrieval of cylindrical harmonics , 1987 .

[6] S. Candel,et al. Simultaneous calculation of Fourier-bessel transforms up to order N , 1981 .

[7] John N. Tsitsiklis,et al. A fast algorithm for linear estimation of two- dimensional isotropic random fields , 1985, IEEE Trans. Inf. Theory.

[8] Israel Gohberg,et al. On an extension problem, generalized fourier analysis, and an entropy formula , 1980 .