On index theory for non‐Fredholm operators: A (1 + 1)‐dimensional example

Abstract. Take a one-parameter family of self-adjoint Fredholm operators {A(t)} t∈R on a Hilbert space H, joining endpoints A ± . There is a long history of work on the question of whether the spectral flow along this path is given by the index of the operator D A = (d/dt) + A acting in L 2 (R; H), where A denotes the multiplication operator (Af )(t) = A(t)f (t) for f ∈ dom(A). Most results are about the case where the operators A(·) have compact resolvent. In this article we review what is known when these operators have some essential spectrum and describe some new results.Using the operators

show abstract

“…First, rewriting Next, one notes that 10) implies the required convergence. Consequently, 11) completes the proof of item (i).…”

Section: Trace Formulas For a Class Of Non-fredholm Operators: A Revimentioning

confidence: 99%

“…We will focus on examples of the non-Fredholm case motivated by recent progress in [10]- [14]. Remark 1.1.…”

Section: Introduction and Reviewmentioning

confidence: 99%

Trace formulas for a class of non-Fredholm operators: A review

et al. 2016

Self Cite

View full text Add to dashboard Cite

show abstract

“…To keep the following sufficiently short, we only describe one of the consequences of our continuity results. We note, however, that it was precisely this consequence that was employed in recent applications to Witten index computations for certain classes of non-Fredholm Dirac-type operators without a mass gap in [7]- [9] (see also [10], [14]). To set this up, assume that A 0 and B 0 are fixed self-adjoint operators in the Hilbert space H, and there exists m ∈ N, m odd, such that,…”

Section: Introductionmentioning

confidence: 97%

“…The Witten index for these types of non-Fredholm Dirac-type operators (a concept extending the Fredholm index) is computed in terms of spectral shift functions and the latter are approximated by the spectral shift functions corresponding to the pseudo-differential approximants. Due to limitations of space we will not go into further details at this point but refer to [7]- [9] (see also [14]).…”

Section: Introductionmentioning

confidence: 99%

Double operator integral methods applied to continuity of spectral shift functions

Carey¹,

Gesztesy²,

Levitina³

et al. 2016

J. Spectr. Theory

Self Cite

View full text Add to dashboard Cite

Abstract. We derive two principal results in this note. To describe the first, assume that A, B, An, Bn, n ∈ N, are self-adjoint operators in a complex, separable Hilbert space H, and suppose that s-limn→∞(An ∞), and assume that for all a ∈ R\{0},Then for any function f in the class, which permits the use of differences of higher powers m ∈ N of resolvents to control the · Bp(H) -norm of the left-hand side [f (A) − f (B)] for f ∈ Fm(R). Our second result is concerned with the continuity of spectral shift functions ξ( · ; B, B 0 ) associated with a pair of of self-adjoint operators (B, B 0 ) in H with respect to the operator parameter B. For brevity, we only describe one of the consequences of our continuity results: Assume that A 0 and B 0 are fixed self-adjoint operators in H, and there exists m ∈ N, m odd, such that,we denote by Γm(T ) the set of all self-adjoint operators S in H for which the containment (S −zI H ) −m −(T −zI H ) −m ∈ B 1 (H), z ∈ C\R, holds. Suppose that B 1 ∈ Γm(B 0 ) and let {Bτ } τ ∈[0,1] ⊂ Γm(B 0 ) denote a continuous path (in a suitable topology on Γm(B 0 ), cf. (1.9)) fromThe fact that higher powers m ∈ N, m 2, of resolvents are involved, permits applications of this circle of ideas to elliptic partial differential operators in R n , n ∈ N. The methods employed in this note rest on double operator integral (DOI) techniques.

show abstract

“…This paper was motivated by recent investigations of the Witten index (a possible substitute for the Fredholm index) for classes of non-Fredholm operators, a prime example of which being the massless Dirac operator, see, for instance, [13]- [15].…”

Section: Introductionmentioning

confidence: 99%

On the Global Limiting Absorption Principle for Massless Dirac Operators

Carey

Gesztesy

Kaad

et al. 2018

Ann. Henri Poincaré

Self Cite

View full text Add to dashboard Cite

We prove a global limiting absorption principle on the entire real line for free, massless Dirac operators H 0 = α · (−i∇) for all space dimensions n ∈ N, n 2. This is a new result for all dimensions other than three, in particular, it applies to the two-dimensional case which is known to be of some relevance in applications to graphene.We also prove an essential self-adjointness result for first-order matrixvalued differential operators with Lipschitz coefficients.

show abstract

On index theory for non‐Fredholm operators: A (1 + 1)‐dimensional example

Cited by 12 publications

References 24 publications

Trace formulas for a class of non-Fredholm operators: A review

Trace formulas for a class of non-Fredholm operators: A review

Double operator integral methods applied to continuity of spectral shift functions

On the Global Limiting Absorption Principle for Massless Dirac Operators

Contact Info

Product

Resources

About