Guido Cavallaro | Ricerc@Sapienza

Pubblicazioni

Titolo	Pubblicato in	Anno
The gravitational Vlasov-Poisson system with infinite mass and velocities in $\mathbb{R}^3$	COMMUNICATIONS IN MATHEMATICAL SCIENCES	2024
Long Time Evolution of Concentrated Vortex Rings with Large Radius	JOURNAL OF STATISTICAL PHYSICS	2024
Global time evolution of concentrated vortex rings	ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND PHYSIK	2022
Vanishing viscosity limit for concentrated vortex rings	JOURNAL OF MATHEMATICAL PHYSICS	2022
Time evolution of vortex rings with large radius and very concentrated vorticity	JOURNAL OF MATHEMATICAL PHYSICS	2021
Long time localization of modified surface quasi-geostrophic equations	DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS. SERIES B.	2021
The Vlasov Equation with Infinite Mass	Recent Advances in Kinetic Equations and Applications	2021
Time evolution of a Vlasov–Poisson plasma with different species and infinite mass in R3	ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND PHYSIK	2020
EFFICACY OF A MAGNETIC SHIELD AGAINST A VLASOV-POISSON PLASMA	REPORTS ON MATHEMATICAL PHYSICS	2019
The Vlasov-Poisson equation in R^3 with infinite charge and velocities	JOURNAL OF HYPERBOLIC DIFFERENTIAL EQUATIONS	2018
On the magnetic shield for a Vlasov-Poisson plasma	JOURNAL OF STATISTICAL PHYSICS	2017
Time evolution of an infinitely extended Vlasov system with singular mutual interaction	JOURNAL OF STATISTICAL PHYSICS	2016
A Vlasov-Poisson plasma with unbounded mass and velocities confined in a cylinder by a magnetic mirror	KINETIC AND RELATED MODELS	2016
Gas of point particles	Mathematical Models of Viscous Friction	2015
Time evolution of a Vlasov-Poisson plasma with infinite charge in R^3	COMMUNICATIONS IN PARTIAL DIFFERENTIAL EQUATIONS	2015
On a Vlasov-Poisson plasma confined in a torus by a magnetic mirror	JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS	2015
Vlasov approximation	Mathematical Models of Viscous Friction	2015
Motion of a body immersed in a vlasov system	Mathematical Models of Viscous Friction	2015
Motion of a body immersed in a stokes fluid	Mathematical Models of Viscous Friction	2015
Mathematical models of viscous friction preface	Mathematical Models of Viscous Friction	2015

ERC

PE1_12

Interessi di ricerca

Classical and Statistical Mechanics, Kinetic Theory, Fluid Dynamics, Interacting Particle Systems.

Keywords

point vortex model

vortex rings

Vlasov–Poisson equation

body fluids

Cauchy problem