Superresolution in the maximum entropy approach to invert Laplace transforms

Abstract

The method of maximum entropy has proven to be a rather powerful way to solve the inverse problem consisting of determining a probability density fS(s) on [0,∞) from the knowledge of the expected value of a few generalized moments, that is, of functions gi(S) of the variable S. A version of this problem, of utmost relevance for banking, insurance, engineering and the physical sciences, corresponds to the case in which S ≥ 0 and gi(s)=(-αi s), th expected values E[-αi S)] are the values of the Laplace transform of S the points αi on the real line. Since inverting the Laplace transform is an ill-posed problem, to devise numerical tecniques that are efficient is of importance for many applications, specially in cases where all we know is the value of the transform at a few points along the real axis. A simple change of variables transforms the Laplace inversion problem into a fractional moment problem on [0,1]. It is remarkable that the maximum entropy procedure allows us to determine the density on [0,1] with high accuracy. In this note, we examine why this might be so.