On Index Theory for Non-Fredholm Operators: A $(1+1)$-Dimensional Example

TL;DR

This paper develops a new approach to index theory for non-Fredholm operators, specifically analyzing a (1+1)-dimensional differential operator with asymptotic behavior, and computes its Witten index explicitly.

Contribution

It introduces an approximation technique to study the Witten index for non-Fredholm operators, extending the framework of previous index theory to new classes of differential operators.

Findings

Witten index equals the spectral shift function at zero

Explicit formula for the index as an integral of the potential function

Extension of index theory to operators violating trace class conditions

Abstract

Using the general formalism of [12], a study of index theory for non-Fredholm operators was initiated in [9]. Natural examples arise from $(1+1)$-dimensional differential operators using the model operator $D_A$ in $L^2(\mathbb{R}^2; dt dx)$ of the type $D_A = (d/dt) + A$, where $A = \int^{\oplus}_{\mathbb{R}} dt \, A(t)$, and the family of self-adjoint operators $A(t)$ in $L^2(\mathbb{R}; dx)$ is explicitly given by $A(t) = - i (d/dx) + \theta(t) \phi(\cdot)$, $t \in \mathbb{R}$. Here $\phi: \mathbb{R} \to \mathbb{R}$ has to be integrable on $\mathbb{R}$ and $\theta: \mathbb{R} \to \mathbb{R}$ tends to zero as $t \to - \infty$ and to $1$ as $t \to + \infty$. In particular, $A(t)$ has asymptotes in the norm resolvent sense $A_- = - i (d/dx)$, $A_+ = - i (d/dx) + \phi(\cdot)$ as $t \to \mp \infty$. Since $D_A$ violates the relative trace class condition introduced in [9], we now employ a new approach based on an approximation technique. The approximants do fit the framework of [9] and lead to the following results: Introducing $H_1 = {D_A}^* D_A$, $H_2 = D_A {D_A}^*$, we recall that the resolvent regularized Witten index of $D_A$, denoted by $W_r(D_A)$, is defined by $$ W_r(D_A) = \lim_{\lambda \to 0} (- \lambda) {\rm tr}_{L^2(\mathbb{R}^2; dtdx)}((H_1 - \lambda I)^{-1} - (H_2 - \lambda I)^{-1}). $$ In the concrete example at hand, we prove $$ W_r(D_A) = \xi(0_+; H_2, H_1) = \xi(0; A_+, A_-) = 1/(2 \pi) \int_{\mathbb{R}} dx \, \phi(x). $$ Here $\xi(\, \cdot \, ; S_2, S_1)$, denotes the spectral shift operator for the pair $(S_2,S_1)$, and we employ the normalization, $\xi(\lambda; H_2, H_1) = 0$, $\lambda < 0$.