[1] Yifei Wu, Fangyan, Yao: A first-order Fourier integrator for the nonlinear Schrödingerequation on T without loss of regularity,Mathematics of Computation,2021, to appear.
[2] Marius Beceanu; Qingquan Deng; Avy Soffer and Yifei Wu, Large global solutions fornonlinearSchrödinger equations II. Mass-supercritical, energy-subcritical cases, Comm. Math. Phys., 2021, 2.386;2.
[3] Marius Beceanu; Qingquan Deng; Avy Soffer and Yifei Wu, Large global solutions fornonlinearSchrödinger equations I. Mass-subcritical cases, Adv. Math., 2021, 1.688, 0.
[4] Li Buyang and Wu, Yifei, A fully discrete low-regularity integrator for the 1D periodiccubicnonlinear Schrödinger equation, Numer. Math, 2021, 2.223, 3.
[5] Yifei Wu; Xiaofei Zhao, Optimal convergence of a second order low-regularity integratorfor the KdVequation, IMA J. Numer. Anal., (2021) drab054.
[6] Bing Li, Masahito Ohta, Yifei Wu, Jun Xue, Instability of the solitary waves for thegeneralizedBoussinesq equations, SIAM J.Math.Anal., 52 (2020), 3192-3221.
[7] Ruobing Bai; Yifei Wu; Jun Xue, Optimal small data scattering for the generalizedderivativenonlinear Schrödinger equation, Journal of Differential Equation, 269 (2020), 6422-6447.
[8] Zihua Guo, Cui Ning, Yifei Wu, Instability of the solitary wave solutions for thegeneralizedderivative nonlinear Schrödinger equation in the critical frequency case, Mathematical Research Letters,2019.
[9] Jiahong Wu, Yifei Wu, Global small solutions to the compressible 2D Magnetohydrodynamicsystemwithout magnetic diffusion; Advances in Mathematics, V.310; 2017; 759-888.
[10] Stefan Le Coz, Yifei Wu: Stability of multi-solitons for the derivative nonlinearSchrödingerequation; International Mathematics Research Notices, 2017, RNX013.
[11] Jiguang Bao, Yifei Wu: Global well-posedness for periodic generalized Korteweg-de Vriesequation;Indiana University Mathematics Journal, V. 66; 2017, 1797-1825.
[12] Soonsik Kwon, Yifei Wu: Orbital stability of solitary waves for derivative nonlinearSchrodingerequation?Journal d?Analyse Mathematique, 2017.
[13] Zihua Guo, Yifei Wu: Global well-posedness for the derivative nonlinear Schroingerequation inH1/2(R), Discrete Contin. Dyn. Syst. Ser. A 37 (2017) 257-264.
[14] Cui Ning, Masahito Ohta, Yifei Wu, Instability of solitary wave solutions for derivativenonlinearSchrödinger equation in endpoint case, Journal of Differential Equation, 262,1671-1689, 2017.
[15] Dapeng Du, Yifei Wu, Kaijun Zhang: On Blow-up criterion for the Nonlinear SchrödingerEquation,Discrete and Continuous Dynamical Systems, Series A, V.36 (7), 2016, 3639-3650.
[16] Yifei Wu: Global well-posedness on the derivative nonlinear Schrödinger equation,Analysis & PDE,V.8, 2015, 1101-1112.
[17] Jiahong Wu, Yifei Wu, Xiaojing Xu: Global small solution to the 2D MHD system with avelocitydamping term, SIAM Journal of Mathematical Analysis, V.47, 2015, 2630?2656.
[18] Dong Li?Yifei Wu: The Cauchy problem for the two dimensional Euler-Poisson system,Journal of theEuropean Mathematical Society, V.16 (10), 2211-2266, 2014.
[19] Yifei Wu: Global well-posedness for the nonlinear Schrödinger equation with derivativein energyspace, Analysis & PDE, V.6, pp 1989-2002, 2013.
[20] Yongsheng Li, Yifei Wu, Guixiang Xu: Global well-posedness for the mass-criticalnonlinearSchrödinger equation, SIAM Journal of Mathematical Analysis, V.43, pp 322-340, 2011.
[21] Changxing Miao, Yifei Wu, Guixiang Xu: Global well-posedness for Schrödinger equationwithderivative in H1/2(R), Journal of Differential Equation, V.251, pp 2164-2195, 2011.
[22] Yongsheng Li, Yifei Wu, Guixiang Xu: Global well-posedness for the periodicmass-critical nonlinearSchrödinger equation, Journal of Differential Equation, V.250, pp 2715-2736, 2011.