论文信息 - On the stability and sensitivity of multidimensional signal reconstruction from Fourier transform magnitude

On the stability and sensitivity of multidimensional signal reconstruction from Fourier transform magnitude

In this paper, we deal with the problem of retrieving a finite-extent signal from the magnitude of its Fourier transform. We consider the discrete phase retrieval problem as a special case of a more general problem which consists of recovering a real-valued signal x from the magnitude of the output of a linear distortion: |Hx| (j), j=1 ....,n. An important result concerning the conditioning of this problem will be obtained for this general setting by means of algebraic-geometric techniques. In particular, the problems of the existence of a solution for phase retrieval, conditioning of the problem and stability of the (essentially) unique solution will be addressed.

T. Huang | J. Sanz

[1] L. G. Sodin,et al. On the ambiguity of the image reconstruction problem , 1979 .

[2] Thomas S. Huang,et al. A note on iterative fourier transform phase reconstruction from magnitude , 1984 .

[3] M. Hayes,et al. Reducible polynomials in more than one variable , 1982, Proceedings of the IEEE.

[4] M. Hayes. The reconstruction of a multidimensional sequence from the phase or magnitude of its Fourier transform , 1982 .

[5] Thomas S. Huang,et al. Polynomial system of equations and its applications to the study of the effect of noise on multidimensional Fourier transform phase retrieval from magnitude , 1985, IEEE Trans. Acoust. Speech Signal Process..

[6] R. H. T. Bates,et al. Composite two-dimensional phase-restoration procedure , 1983 .

[7] Fernando Cukierman,et al. Stability of unique Fourier-transform phase reconstruction , 1983 .

[8] H. Ferwerda,et al. The Phase Reconstruction Problem for Wave Amplitudes and Coherence Functions , 1978 .