Inverse scattering series is the only nonlinear, direct inversion method for the multidimensional, acoustic or elastic equation. Recently developed techniques for inverse problems based on the inverse scattering series [Weglein et al., Geophys., 62 (1997), pp. 1975--1989; Top. Rev. Inverse Problems, 19 (2003), pp. R27--R83] were shown to require two mappings, one associating nonperturbative description of seismic events with their forward scattering series description and a second relating the construction of events in the forward to their treatment in the inverse scattering series. This paper extends and further analyzes the first of these two mappings, introduced, for 1D normal incidence, in Matson [J. Seismic Exploration, 5 (1996), pp. 63--78] and later extended to two dimensions in Matson [An Inverse Scattering Series for Attenuating Elastic Multiples from Multicomponent Land and Ocean Bottom Seismic Data, Ph.D. thesis, Department of Earth and Ocean Sciences, University of British Columbia, Vancouver,...
[1]
V. Edwards.
Scattering Theory
,
1973,
Nature.
[2]
G. M..
An Introduction to the Theory of Infinite Series
,
1908,
Nature.
[3]
Arthur B. Weglein,et al.
Inverse scattering series and seismic exploration
,
2003
.
[4]
Robert W. Clayton,et al.
A Born-WKBJ inversion method for acoustic reflection data
,
1981
.
[5]
L. Milne‐Thomson.
A Treatise on the Theory of Bessel Functions
,
1945,
Nature.
[6]
Arthur B. Weglein,et al.
Migration and inversion of seismic data
,
1985
.
[7]
Arthur B. Weglein,et al.
An inverse-scattering series method for attenuating multiples in seismic reflection data
,
1997
.