Lower bounds for the truncated Hilbert transform

Abstract

Given two intervals I, J ⊂ R, we ask whether it is possible to reconstruct a real-valued function f ∈ L2(I) from knowing its Hilbert transform Hf on J. When neither interval is fully contained in the other, this problem has a unique answer (the nullspace is trivial) but is severely ill-posed. We isolate the difficulty and show that by restricting f to functions with controlled total variation, reconstruction becomes stable. In particular, for functions f ∈ H1(I), we show that \|Hf\|L2(J) ≥ c1 (-c2 \|fx\|L2(I)\|f\|L2(I)) \| f \|L2(I) , for some constants c1, c2 > 0 depending only on I, J. This inequality is sharp, but we conjecture that \|fx\|L2(I) can be replaced by \|fx\|L1(I).