MEPHYSTO - 2019 - Annual activity report

MEPHYSTO

MEPHYSTO - 2019

Team Mephysto

Team, Visitors, External Collaborators

Overall Objectives

Research Program

Time asymptotics: Stationary states, solitons, and stability issues
Derivation of macroscopic laws from microscopic dynamics
Numerical methods: analysis and simulations

Highlights of the Year

New Results

Traveling waves for some nonlocal 1D Gross-Pitaevskii equations with nonzero conditions at infinity
Numerical simulation of traveling waves for some nonlocal Gross-Pitaevskii equations with nonzero conditions at infinity in dimensions 1 and 2
The cubic Schrödinger regime of the Landau-Lifshitz equation with a strong easy-axis anisotropy
The Cauchy problem for the Landau–Lifshitz–Gilbert equation in BMO and self-similar solutions
Microscopic derivation of moving interfaces problems
Towards the weak KPE universality conjecture
Joule effect in chains of oscillators
Quantum optics
Orbital stability
Exponential time-decay for discrete Fokker–Planck equations
Energy preserving methods for nonlinear Schrödinger equations
High order linearly implicit methods for evolution problems
CLT for Circular beta-Ensembles at High Temperature
DLR equations and rigidity for the Sine- $β$ process

Partnerships and Cooperations

National Initiatives
European Initiatives

Dissemination

Promoting Scientific Activities
Teaching - Supervision - Juries
Popularization

Bibliography

Major publications
Publications of the year
References in notes

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Section: New Results

High order linearly implicit methods for evolution problems

In [31], I. Lacroix and G. Dujardin have developed a new class of numerical integration methods for evolution problems. This class contains methods of arbitrarily high order that only require the solution of a linear system per time step. For evolution ODEs (Cauchy problems), they give a constructive proof of existence for such arbitrarily high order methods. For evolution PDEs, they demonstrate numerically that these new methods can outperform high order methods from the literature on several test cases.

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