Diagonalization of the finite Hilbert transform on two adjacent intervals: the Riemann-Hilbert approach

Abstract

In this paper we study the spectra of bounded self-adjoint linear operators that are related to finite Hilbert transforms HL:L2([bL,0]) L2([0,bR]) and HR:L2([0,bR]) L2([bL,0]). These operators arise when one studies the interior problem of tomography. The diagonalization of HR,HL has been previously obtained, but only asymptotically when bL≠-bR. We implement a novel approach based on the method of matrix Riemann-Hilbert problems (RHP) which diagonalizes HR,HL explicitly. We also find the asymptotics of the solution to a related RHP and obtain error estimates.