Resonant rigidity for Schrödinger operators in even dimensions
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Publication:2414922
DOI10.1007/s00023-019-00791-6zbMath1432.35063arXiv1712.07636OpenAlexW2962819402MaRDI QIDQ2414922
Publication date: 17 May 2019
Published in: Annales Henri Poincaré (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1712.07636
Related Items (2)
On the trace of the wave group and regularity of potentials ⋮ Compactness of iso-resonant potentials for Schrödinger operators in dimensions one and three
Cites Work
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- Heat traces and existence of scattering resonances for bounded potentials
- A sub-logarithmic lower bound for resonance counting function in two-dimensional potential scattering
- The Schrödinger operator: Perturbation determinants, the spectral shift function, trace identities, and all that
- Spectral properties of Schrödinger operators and time-decay of the wave functions. Results in \(L^ 2(R^ 4)\)
- Distribution of poles for scattering on the real line
- Spectral properties of Schrödinger operators and time-decay of the wave functions results in \(L^2(\mathbb{R}^m),\;m\geq 5\)
- Poisson formula for resonances in even dimensions
- Sharp bounds on the number of scattering poles in even-dimensional spaces
- Asymptotic distribution of resonances in one dimension
- Scattering theory: some old and new problems
- New trace formulas in terms of resonances for three-dimensional Schrödinger operators
- Resonances in one dimension and Fredholm determinants
- Lower bounds for the number of resonances in even dimensional potential scattering
- Schrödinger operators with complex-valued potentials and no resonances
- The theory of Hahn-meromorphic functions, a holomorphic Fredholm theorem, and its applications
- A Remark on Isopolar Potentials
- Some remarks on resonances in even-dimensional Euclidean scattering
- Dispersion Decay and Scattering Theory
- On the trace of Schrödinger heat kernels and regularity of potentials
- Lower bounds for resonance counting functions for obstacle scattering in even dimensions
- Stochastic stability of Pollicott–Ruelle resonances
- On the compactness of ISO-spectral potentials
- Sharp condition on the decay of the potential for the absence of a zero-energy ground state of the Schrodinger equation
- Compactness of iso-resonant potentials for Schrödinger operators in dimensions one and three
- A polynomial bound on the number of the scattering poles for a potential in even dimensional spaces IRn
- Local and global spectral shift functions in R2
- Une formule de traces pour l'opérateur de Schrödinger dans $\mathbb{R}^3$
- Complex Scaling and the Distribution of Scattering Poles
- Upper Bounds for the Resonance Counting Function of Schrödinger Operators in Odd Dimensions
- Sharp Bounds on the Number of Scattering Poles in the Two Dimensional Case
- Compactness of isospectral potentials
- Inverse resonance scattering on the real line
- On the heat trace of schrödinger operators
- Isoresonant Complex-valued Potentials and Symmetries
- Isophasal, isopolar, and isospectral Schrödinger operators and elementary complex analysis
- Large scale detection of half-flats in CAT(0)-spaces
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