Singular limits of certain Hilbert-Schmidt integral operators

TL;DR

This paper investigates the spectral behavior of a Hilbert-Schmidt integral operator on touching multi-intervals, revealing finite-dimensionality of the discontinuity subspace and providing estimates on the operator's inversion instability.

Contribution

The authors analyze the small-$mbda$ spectral asymptotics of an integral operator with touching intervals, extending previous work to the case where the union of intervals is a single interval.

Findings

Eigenvalues do not accumulate at zero.

Discontinuity subspace is finite-dimensional and smooth.

Provides exponential estimates for inversion instability.

Abstract

In this paper we study the small-$\lambda$ spectral asymptotics of an integral operator $\mathscr{K}$ defined on two multi-intervals $J$ and $E$, when the multi-intervals touch each other (but their interiors are disjoint). The operator $\mathscr{K}$ is closely related to the multi-interval Finite Hilbert Transform (FHT). This case can be viewed as a singular limit of self-adjoint Hilbert-Schmidt integral operators with so-called integrable kernels, where the limiting operator is still bounded, but has a continuous spectral component. The regular case when $\text{dist}(J,E)>0$, and $\mathscr{K}$ is of the Hilbert-Schmidt class, was studied in an earlier paper by the authors. The main assumption in this paper is that $U=J\cup E$ is a single interval. We show that the eigenvalues of $\mathscr{K}$, if they exist, do not accumulate at $\lambda=0$. Combined with the results in an earlier paper by the authors, this implies that $H_p$, the subspace of discontinuity (the span of all eigenfunctions) of $\mathscr{K}$, is finite dimensional and consists of functions that are smooth in the interiors of $J$ and $E$. We also obtain an approximation to the kernel of the unitary transformation that diagonalizes $\mathscr{K}$, and obtain a precise estimate of the exponential instability of inverting $\mathscr{K}$. Our work is based on the method of Riemann-Hilbert problem and the nonlinear steepest-descent method of Deift and Zhou.