@Article{CAM-7-21, author = {}, title = {期刊内容: Communications in Mathematical Sciences (CMS),Vol. 9, No. 1, 2011}, journal = {CAM-Net Digest}, year = {2010}, volume = {7}, number = {21}, pages = {1--1}, abstract = {
主 题: Table of Contents, Communications in Mathematical Science
Kerr-Debye relaxation shock profiles for Kerr equations
Denise Aregba-Driollet and Bernard Hanouzet
Multi-scale methods for wave propagation in heterogeneous media
Bjorn Engquist, Henrik Holst, and Olof Runborg
On the uniqueness for sub-critical quasi-geostrophic equations
Lucas C. F. Ferreira
On the Cauchy problem for the nonlocal derivative nonlinear Schrodinger
equation
Roger Peres de Moura and Ademir Pastor
Wave propagation in shallow-water acoustic random waveguides
Christophe Gomez
Relaxation to equilibrium in diffusive-thermal models with a strongly
varying diffusion length-scale
Paul Clavin, Laurent Masse, and Jean-Michel Roquejoffre
On the Ostwald ripening of thin liquid films
Shibin Dai
On the uniqueness of entropy solutions to the Riemann problem for 2x2
hyperbolic systems of conservation laws
Hiroki Ohwa
High-order entropy-based closures for linear transport in slab geometry
Cory D. Hauck
Asymptotic stability of rarefaction waves in radiative hydrodynamics
Chunjin Lin
A parametrix construction for the wave equation with low regularity
coefficients using a frame of Gaussians
Alden Waters
From Boltzmann equation to spherical harmonics expansion model: diffusion
limit and Poisson coupling
Mohamed Lazhar Tayeb
An improvement of the TYT algorithm for GF(2m) based on reusing
intermediate computation results
Yin Li, Gong-liang Chen, Yi-yang Chen, and Jian-hua Li
A singular 1-D Hamilton-Jacobi equation, with application to large
deviation of diffusions
Xiaoxue Deng, Jin Feng, and Yong Liu
A weak trapezoidal method for a class of stochastic differential equations
David F. Anderson and Jonathan C. Mattingly
Crank-Nicolson finite element methods using symmetric stabilization with
an application to optimal control problems subject to transient advection
- diffusion equations
Erik Burman