The Finite Hilbert Transform in ℒ2

## Abstract The boundedness of the finite Hilbert transform operator on certain weighted __L~p~__ spaces is well known. We extend this result to give the boundedness of that operator on certain weighted Sobolev spaces. (© 2004 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

In this paper we give new representations for the Fourier transform and we establish the relation between those representations and the well known uncertainty principle.

These results are due to KWAPIEN [ll], PISIEB [18] and Borntom [3], BWKHOLDER [5], respectively. We call an operator u: bounded. Define &(u) := Ilu Q Hll. The claas of HT-operators forms an injective, surjective, completely symmetric and maximal BANACH ideal (in the sense of PJETSCH [17)}, see cha

Recently we published two explicit formulae for finite inverse Hilbert transforms (You and Zeng, Inv Probl 22 (2006), L7-L101). This paper presents a straightforward proof of the formulae, the data requirements, and some computer simulations to verify the formulae. Examples of region-of-interest tom