Inversion formula and range conditions for a vector multi-interval finite Hilbert transform in L2

Abstract

Given n disjoint intervals Ij, on R together with n functions j∈ L2(Ij), j=1,… n, and an n× n matrix , the problem is to find an L2 solution = Col (1,…, n), j ∈ L2(Ij) to the linear system H = , where H = diag ( H1 ,…, Hn) is a matrix of finite Hilbert transforms and =diag(1,…,n) is a matrix of the corresponding characteristic functions on Ij, and = Col (1,…,n). Since we can interpret H as a generalized vector multi-interval finite Hilbert transform, we call the formula for the solution as "the inversion formula" and the necessary and sufficient conditions for the existence of a solution as the "range conditions". In this paper we derive the explicit inversion formula and the range conditions in two specific cases: a) the matrix is symmetric and positive definite, and; b) all the entries of are equal to one. We also prove the uniqueness of solution, that is, that our transform is injective. When the matrix is positive definite, the inversion formula is given in terms of the solution of the associated matrix Riemann-Hilbert Problem. We also discuss other cases of the matrix .