The smoothing effect in sharp Gevrey space for the spatially homogeneous non-cutoff Boltzmann equations with a hard potential
From MaRDI portal
Publication:6192409
DOI10.1007/s10473-024-0205-0OpenAlexW4389507346MaRDI QIDQ6192409
Publication date: 11 March 2024
Published in: Acta Mathematica Scientia. Series B. (English Edition) (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10473-024-0205-0
Smoothness and regularity of solutions to PDEs (35B65) Hypoelliptic equations (35H10) Boltzmann equations (35Q20)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Sharp anisotropic estimates for the Boltzmann collision operator and its entropy production
- Gevrey smoothing effect of solutions for spatially homogeneous nonlinear Boltzmann equation without angular cutoff
- The Boltzmann equation without angular cutoff in the whole space. I: global existence for soft potential
- Smoothing estimates for Boltzmann equation with full-range interactions: spatially homogeneous case
- The Boltzmann equation without angular cutoff in the whole space: qualitative properties of solutions
- Regularizing effect and local existence for the non-cutoff Boltzmann equation
- Spectral gap and coercivity estimates for linearized Boltzmann collision operators without angular cutoff
- Regularity of solutions for spatially homogeneous Boltzmann equation without angular cutoff
- Littlewood-Paley theory and regularity issues in Boltzmann homogeneous equations. II. Non cutoff case and non Maxwellian molecules
- Regularity of solutions to the spatially homogeneous Boltzmann equation without angular cutoff
- Ultra-analytic effect of Cauchy problem for a class of kinetic equations
- Analytic smoothness effect of solutions for spatially homogeneous Landau equation
- Regularity estimates via the entropy dissipation for the spatially homogeneous Boltzmann equation without cut-off
- Entropy dissipation and long-range interactions
- Gevrey regularity for the noncutoff nonlinear homogeneous Boltzmann equation with strong singularity
- About the regularizing properties of the non-cut-off Kac equation
- The Cauchy problem for the radially symmetric homogeneous Boltzmann equation with Shubin class initial datum and Gelfand-Shilov smoothing effect
- Gevrey smoothing for weak solutions of the fully nonlinear homogeneous Boltzmann and Kac equations without cutoff for Maxwellian molecules
- Gevrey regularity of mild solutions to the non-cutoff Boltzmann equation
- The Gevrey smoothing effect for the spatially inhomogeneous Boltzmann equations without cut-off
- Analytic smoothing effect for the nonlinear Landau equation of Maxwellian molecules
- Smoothing effect of the homogeneous Boltzmann equation with measure valued initial datum
- Gelfand-Shilov smoothing properties of the radially symmetric spatially homogeneous Boltzmann equation without angular cutoff
- Global hypoelliptic and symbolic estimates for the linearized Boltzmann operator without angular cutoff
- Local existence with mild regularity for the Boltzmann equation
- Global classical solutions of the Boltzmann equation without angular cut-off
- Smoothness of the Solution of the Spatially Homogeneous Boltzmann Equation without Cutoff
- Local solutions in gevrey classes to the nonlinear Boltzmann equation without cutoff
- Régularité et compacité pour des noyaux de collision de Boltzmann sans troncature angulaire
- Regularization properties of the 2-dimensional non radially symmetric non cutoff spatially homogeneous Boltzmann equation for Maxwellian molecules
- Global Mild Solutions of the Landau and <scp>Non‐Cutoff</scp> Boltzmann Equations
- LITTLEWOOD–PALEY THEORY AND REGULARITY ISSUES IN BOLTZMANN HOMOGENEOUS EQUATIONS I: NON-CUTOFF CASE AND MAXWELLIAN MOLECULES
- Explicit Coercivity Estimates for the Linearized Boltzmann and Landau Operators
- Analytic smoothing effect of the spatially inhomogeneous Landau equations for hard potentials
This page was built for publication: The smoothing effect in sharp Gevrey space for the spatially homogeneous non-cutoff Boltzmann equations with a hard potential
