Decay estimates for fourth-order Schrödinger operators in dimension two
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Publication:2680196
DOI10.1016/j.jfa.2022.109816OpenAlexW4312208498MaRDI QIDQ2680196
Publication date: 30 January 2023
Published in: Journal of Functional Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2110.07154
Biharmonic and polyharmonic equations and functions in higher dimensions (31B30) Higher-order elliptic equations (35J30)
Cites Work
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- Decay of eigenfunctions of elliptic PDE's. I
- Dispersive estimates for higher dimensional Schrödinger operators with threshold eigenvalues. II: The even dimensional case.
- Dispersive estimates for Schrödinger operators in the presence of a resonance and/or an eigenvalue at zero energy in dimension three. I
- A weighted estimate for two dimensional Schrödinger, matrix Schrödinger, and wave equations with resonance of the first kind at zero energy
- Decay of eigenfunctions of elliptic PDE's. II.
- Dispersive estimates for Schrödinger operators in dimensions one and three
- Carleman estimates and absence of embedded eigenvalues
- \(L^p\)-boundedness of the wave operator for the one dimensional Schrödinger operator
- Spectral properties of Schrödinger operators and time-decay of the wave functions results in \(L^2(\mathbb{R}^m),\;m\geq 5\)
- Spectral properties of Schrödinger operators and time-decay of the wave functions
- Asymptotic expansions in time for solutions of Schrödinger-type equations
- On the absence of positive eigenvalues of Schrödinger operators with rough potentials
- Decay estimates and Strichartz estimates of fourth-order Schrödinger operator
- On the absence of positive eigenvalues for one-body Schrödinger operators
- Time decay for solutions of Schrödinger equations with rough and time-dependent potentials
- The analysis of linear partial differential operators. II: Differential operators with constant coefficients
- A weighted dispersive estimate for Schrödinger operators in dimension two
- The \(W_{k,p}\)-continuity of the Schrödinger wave operators on the line
- \(L^p\)-\(L^{\acute p}\) estimates for the Schrödinger equation on the line and inverse scattering for the nonlinear Schrödinger equation with a potential
- Decay estimates for bi-Schrödinger operators in dimension one
- On the fourth order Schrödinger equation in three dimensions: dispersive estimates and zero energy resonances
- Gaussian bounds for higher-order elliptic differential operators with Kato type potentials
- Dispersive estimates for higher dimensional Schrödinger operators with threshold eigenvalues. I: The odd dimensional case
- On the fourth order Schrödinger equation in four dimensions: dispersive estimates and zero energy resonances
- Dispersive estimates for Schrödinger operators in the presence of a resonance and/or an eigenvalue at zero energy in dimension three. II
- Dispersive estimates for Schrödinger operators in dimension two
- The \(L^p\)-continuity of wave operators for higher order Schrödinger operators
- Dispersive estimates for Schrödinger operators in dimension two with obstructions at zero energy
- Dispersive Estimates for Four Dimensional Schrödinger and Wave Equations with Obstructions at Zero Energy
- Growth properties of solutions of the reduced wave equation with a variable coefficient
- On the 𝐿^{𝑝} boundedness of the wave operators for fourth order Schrödinger operators
- Decay estimates for Schrödinger operators
- Kato Class Potentials for Higher Order Elliptic Operators
- A UNIFIED APPROACH TO RESOLVENT EXPANSIONS AT THRESHOLDS
- Spectral Multipliers, Bochner–Riesz Means and Uniform Sobolev Inequalities for Elliptic Operators
- ERRATUM: A UNIFIED APPROACH TO RESOLVENT EXPANSIONS AT THRESHOLDS
- Dispersion estimates for fourth order Schrödinger equations
- On pointwise decay of waves
- Classical Fourier Analysis
- Decay estimates for higher-order elliptic operators
- On positive eigenvalues of one‐body schrödinger operators
- The \(W^{k,p}\)-continuity of wave operators for Schrödinger operators
- Resonance theory for Schrödinger operators
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