• 検索結果がありません。

Nonlinear and stochastic partial differential equations

N/A
N/A
Info
ダウンロード
Protected

Academic year: 2022

シェア "Nonlinear and stochastic partial differential equations"

Copied!
1
0
0

読み込み中.... (全文を見る)

今ダウンロードする ( 1 ページ )

全文

(1)

Nonlinear and stochastic partial differential equations

Nov. 9, 2019

Room 111 at RIMS, Kyoto University

– Programme –

10:00 – 10:30 Ikkei Shimizu (Kyoto University)

Local well-posedness for Schr¨odinger maps with helicity terms 10:40 – 11:10 Guopeng Li (University of Edinburgh)

Almost conservation laws for stochastic nonlinear Schr¨odinger equations 11:20 – 11:50 Andreia Chapouto (University of Edinburgh)

On well-posedness of the complex-valued modified KdV equation on the circle outside H12

12:00 – 14:00 Lunch

14:00 – 14:50 Justin Forlano (Heriot-Watt University)

Almost sure global well-posedness for the BBM equation with infinite L2 initial data

15:10 – 16:00 Seiichiro Kusuoka (Kyoto University)

Approach to the quantum field with exponential interactions by singular SPDEs

16:20 – 17:10 Tadahiro Oh (University of Edinburgh)

On singular stochastic nonlinear wave equations

Organizers:

Kenji Nakanishi (Kyoto University) Nobu Kishimoto (Kyoto University)

参照

今ダウンロードする ( PDF - 1 ページ - 14.67 KB )

関連したドキュメント

Sharp global well posedness for the non-elliptic derivative Schr¨ odinger equation

By resorting to the smooth effect estimate together with the dispersive estimates in anisotropic Lebesgue spaces, we show that DNLS has a unique global solution if the initial data

for the Semiclassical Limit of the Defocusing Nonlinear Schr ¨odinger Equation

We analyze a class of large time-stepping Fourier spectral methods for the semiclassical limit of the defocusing Nonlinear Schr ¨odinger equation and provide highly stable methods

Cauchy problem for multidimensional coupled system of nonlinear Schr¨ odinger equation and generalized IMBq equation

We prove only the existence, uniqueness and regularity of the generalized local solutions and the classical local solution for the 2-dimensional problem, because we can treat

Generalized Jacobi Elliptic Function Solution to a Class of Nonlinear Schr ¨odinger-Type Equations

In the following, we use the improved Jacobi elliptic function method to seek exact traveling wave solutions of class of nonlinear Schr ¨odinger-type equations which are of interest

Periodic Travelling Wave Solutions of the Modified Boussinesq Equation

Angulo, “Nonlinear stability of periodic traveling wave solutions to the Schr ¨odinger and the modified Korteweg-de Vries equations,” Journal of Differential Equations, vol.

This article concerns the Schr¨odinger equation −∆u+V(x)u=f(x, u), forx∈RN, u(x)→0, as|x

Tang; Two types of ground state solutions for a periodic Schr¨ odinger equation with spectrum point zero, Electron... Chen; Multiple solutions for periodic Schr¨ odinger equations

In this article, we study the nonlinear Schr¨odinger-Poisson system −∆u+u−µ u |x|2 +l(x)φu=k(x)|u|p−2u x∈R3, −∆φ=l(x)u2 x∈R3, wherek∈C(R3) and 4&lt

We prove that Schr¨ odinger-Poisson systems with Hardy potential and indefinite nonlinearity have at least one positive solution, using variational methods.. For more details about

And the initial value problem for the nonlinear Schr¨odinger (NLS) equation ∂tu=i(∆u−F(u

In this work we are interested in removing the requirement that the power of the weight in Theorem 1.3 is integer, by proving the similar result for the non integer values of r ≥ 1