Dr. Lennart Ronge

Postdoktorand

Kontakt
Raum:
2.09.3.15
Telefon:
+49 331 977-1632
...

Office Hour: Monday, 10:00-11:00

Research Interests

  • Differential geometry, particularly Lorentzian geometry
  • Global analysis
  • Operator theory
  • Mathematical physics

Publications

2023 | Extracting Hadamard Coefficients from Green's Operators | Lennart RongeLink zur Publikation , Link zum Preprint

Extracting Hadamard Coefficients from Green's Operators

Autoren: Lennart Ronge (2023)

We develop a formula for the diagonal values of the Hadamard coefficients associated to a normally hyperbolic operator on a globally hyperbolic spacetime in terms of the advanced and retarded Green's operators. We develop a local formula as well as formulae for integrals over (parts of) the diagonal. Furthermore, we develop analogues of the Hadamard expansion for powers of the advanced/retarded Green's operators and an analogue of a resolvent.

2023 | Hadamard expansions for powers of causal Green’s operators and “resolvents” | Lennart RongeZeitschrift: Annals of Global Analysis and GeometryVerlag: SpringerBand: 64Link zur Publikation , Link zum Preprint

Hadamard expansions for powers of causal Green’s operators and “resolvents”

Autoren: Lennart Ronge (2023)

The Hadamard expansion describes the singularity structure of Green’s operators associated with a normally hyperbolic operator P in terms of Riesz distributions (fundamental solutions on Minkowski space, transported to the manifold via the exponential map) and Hadamard coefficients (smooth sections in two variables, corresponding to the heat Kernel coefficients in the Riemannian case). In this paper, we derive an asymptotic expansion analogous to the Hadamard expansion for powers of advanced/retarded Green’s operators associated with P, as well as expansions for advanced/retarded Green’s operators associated with Pz for zC. These expansions involve the same Hadamard coefficients as the original Hadamard expansion, as well as the same or analogous (with built-in z-dependence) Riesz distributions.

Zeitschrift:
Annals of Global Analysis and Geometry
Verlag:
Springer
Band:
64

2021 | The APS-Index and the Spectral Flow | Koen van den Dungen, Lennart RongeZeitschrift: Operators and MatricesVerlag: Ele-MathSeiten: 1393--1416Band: 15 - 4Link zur Publikation , Link zum Preprint

The APS-Index and the Spectral Flow

Autoren: Koen van den Dungen, Lennart Ronge (2021)

We study the Atiyah-Patodi-Singer (APS) index, and its equality to the spectral flow,
in an abstract, functional analytic setting. More precisely, we consider a (suitably continuous or
differentiable) family of self-adjoint Fredholm operators A(t) on a Hilbert space, parametrised
by t in a finite interval. We then consider two different operators, namely D := d/dt + A (the
abstract analogue of a Riemannian Dirac operator) and D := d/dt − iA (the abstract analogue of
a Lorentzian Dirac operator). The latter case is inspired by a recent index theorem by Bär and
Strohmaier (Amer. J. Math. 141 (2019), 1421–1455) for a Lorentzian Dirac operator equipped
with APS boundary conditions. In both cases, we prove that the Fredholm index of the operator
D equipped with APS boundary conditions is equal to the spectral flow of the family A(t) .

Zeitschrift:
Operators and Matrices
Verlag:
Ele-Math
Seiten:
1393--1416
Band:
15 - 4