Eulerian dynamics with a commutator forcing. III: Fractional diffusion of order \(0 < \alpha < 1\)

DOI10.1016/j.physd.2017.09.003zbMath1398.35157arXiv1706.08246OpenAlexW2632788749MaRDI QIDQ1990082

Publication date: 24 October 2018

Published in: Physica D (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1706.08246

zbMATH Keywords

alignment flocking Cucker-Smale model fractional dissipation Motsch-Tadmor averaging protocol

Mathematics Subject Classification ID

Diffusion (76R50) Existence problems for PDEs: global existence, local existence, non-existence (35A01) Fractional partial differential equations (35R11) Euler equations (35Q31) Uniqueness problems for PDEs: global uniqueness, local uniqueness, non-uniqueness (35A02)

Related Items (36)

Global solutions to multi-dimensional topological Euler alignment systems ⋮ Hydrodynamic alignment with pressure II. Multi-species ⋮ Global Regularity for 1D Eulerian Dynamics with Singular Interaction Forces ⋮ Global Regularity for a Nonlocal PDE Describing Evolution of Polynomial Roots Under Differentiation ⋮ Anticipation breeds alignment ⋮ Swarming: hydrodynamic alignment with pressure ⋮ The large-time behavior of the Vlasov alignment model with power-law or Riesz potentials ⋮ Rigorous derivation of the Euler-alignment model with singular communication weights from a kinetic Fokker–Planck-alignment model ⋮ Analysis of the generalized Aw-Rascle model ⋮ Sticky particle Cucker–Smale dynamics and the entropic selection principle for the 1D Euler-alignment system ⋮ Collective behaviors of stochastic agent-based models and applications to finance and optimization ⋮ Global Existence and Limiting Behavior of Unidirectional Flocks for the Fractional Euler Alignment System ⋮ Global well-posedness and asymptotic behavior in critical spaces for the compressible Euler system with velocity alignment ⋮ Global solutions to the tangential Peskin problem in 2-D ⋮ Finite- and infinite-time cluster formation for alignment dynamics on the real line ⋮ Local well-posedness of the topological Euler alignment models of collective behavior ⋮ Singular Cucker–Smale Dynamics ⋮ Topologically Based Fractional Diffusion and Emergent Dynamics with Short-Range Interactions ⋮ Regular solutions to the fractional Euler alignment system in the Besov spaces framework ⋮ The global Cauchy problem for compressible Euler equations with a nonlocal dissipation ⋮ Singularity formation for the fractional Euler-alignment system in 1D ⋮ Entropy Hierarchies for Equations of Compressible Fluids and Self-Organized Dynamics ⋮ Global well-posedness for the Euler alignment system with mildly singular interactions ⋮ On Cucker–Smale dynamical systems with degenerate communication ⋮ Weak and strong solutions to the forced fractional Euler alignment system ⋮ Introduction to special issue: ``Nonlinear partial differential equations in mathematical fluid dynamics ⋮ Global regularity for a 1D Euler-alignment system with misalignment ⋮ Eulerian dynamics with a commutator forcing. II: Flocking ⋮ A fast convolution-based method for peridynamic transient diffusion in arbitrary domains ⋮ Some aspects of the inertial spin model for flocks and related kinetic equations ⋮ Vehicular traffic, crowds, and swarms: From kinetic theory and multiscale methods to applications and research perspectives ⋮ On the structure of limiting flocks in hydrodynamic Euler Alignment models ⋮ Flocking with short-range interactions ⋮ On the Lagrangian trajectories for the one-dimensional Euler alignment model without vacuum velocity ⋮ Global existence and stability of nearly aligned flocks ⋮ Multiflocks: Emergent Dynamics in Systems with Multiscale Collective Behavior

Cites Work

This page was built for publication: Eulerian dynamics with a commutator forcing. III: Fractional diffusion of order \(0 < \alpha < 1\)