Special Session 19: New trends in inverse problems for partial differential equations

Nonlinearity helps convergence of the inverse Born series
Shari Moskow
Drexel University
USA
Co-Author(s):    Nicholas Difilippis, John Schotland
Abstract:
In previous work of the authors, we investigated the Born and inverse Born series for a scalar wave equation with linear and nonlinear terms, the nonlinearity being cubic of Kerr type. We reported conditions which guarantee convergence of the inverse Born series, enabling recovery of the coefficients of the linear and nonlinear terms. In this work, we show that if the coefficient of the linear term is known, an arbitrarily strong Kerr nonlinearity can be reconstructed, for sufficiently small data. Additionally, we show that similar convergence results hold for general polynomial nonlinearities. Our results are illustrated with numerical examples.