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Room P3.10, Mathematics Building
Integrability, Geometry, Asymptotics
Justin Forlano, Monash University.
The intermediate nonlinear Schrödinger equation.
Seminars, for informal dissemination of research results, exploratory work by research teams, outreach activities, etc., constitute the simplest form of meetings at a Mathematics research centre.
CAMGSD has recorded the calendar of its seminars for a long time, this page serving both as a means of public announcement of forthcoming activities but also as a historic record.
For a full search interface see the Mathematics Department seminar page.
Room P3.10, Mathematics Building
Integrability, Geometry, Asymptotics
Justin Forlano, Monash University.
The intermediate nonlinear Schrödinger equation.
Room P3.10, Mathematics Building
Lisbon WADE — Webinar in Analysis and Differential Equations
Justin Forlano, Monash University.
The intermediate nonlinear Schrödinger equation.
In this talk, I will discuss recent results regarding the intermediate nonlinear Schrödinger equation (INLS). Analytically, INLS is a one-dimensional completely integrable nonlinear Schrödinger equation with a cubic derivative nonlinearity and is $L^2$-critical. A limiting form of INLS is the continuum Calogero-Moser equation (CCM), which is also completely integrable. Interestingly, CCM keeps the Hardy space $L^2_+$ invariant, and, under this assumption, tools from complete integrability have recently resolved the well-posedness problem for CCM in $L^2_+$. I will discuss progress on the well-posedness for INLS and CCM (not relying on complete integrability), outside of the Hardy space and in low-regularity. Our approach combines a gauge transformation, bilinear Strichartz estimates and a refined decomposition for smooth solutions. This is based on joint work with A. Chapouto (CNRS, Monash) and T. Laurens (UW-Madison).
Room P3.10, Mathematics Building
Integrability, Geometry, Asymptotics
Andreia Chapouto, Monash University.
Gauge transform for the Korteweg-de Vries equation and well-posedness below the $H^{-1}$-scale.
In this talk, we consider the low regularity well-posedness problem for the Korteweg-de Vries equation (KdV) on the real line. Aiming to bridge the regularity gap between the scaling critical space and the known optimal well-posedness in $L^2$-based Sobolev spaces, we consider rough data in Fourier-Lebesgue spaces. Via infinite normal form reductions and exploiting algebraic cancellations, we introduce a new gauged KdV equation, equivalent to the original one at high regularity, but better behaved for rough solutions below the $H^{-1}$-scale. Surprisingly, our method does not rely on the completely integrable structure of KdV and is easily adapted to other equations with quadratic derivative nonlinearities, such as the dispersion-generalized Benjamin-Ono equations.
This talk is based on joint work with Simão Correia (IST, U. Lisboa) and João Pedro Ramos (IMPA).
Room P3.10, Mathematics Building
Lisbon WADE — Webinar in Analysis and Differential Equations
Andreia Chapouto, Monash University.
Gauge transform for the Korteweg-de Vries equation and well-posedness below the $H^{-1}$-scale.
Room P3.10, Mathematics Building
Max Reinhold Jahnke, Universität zu Köln.