张翼
基本信息Personal Information
教授
主要任职 : 浙江省应用数学研究会副理事长
曾获荣誉 : 曾荣获浙江省科学技术奖一等奖;获浙江省人民政府优秀教学成果奖二等奖、浙江省高校科研成果奖一等奖等奖项。
性别 : 男
毕业院校 : 上海大学数学系
学历 : 博士研究生毕业
学位 : 博士学位
在职信息 : 在岗
所在单位 : 数学科学学院
入职时间 : 1984年08月01日
学科 : 数学与应用数学
办公地点 : 数学科学学院20-405办公室
Email :
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- [1]程丽.A KdV-Type Wronskian Formulation to Generalized KP, BKP and Jimbo–Miwa Equations.Communications in Theoretical Physics.2017 (第7期):1-5
- [2]Children with positive attitudes towards mind-wandering provide invalid subjective reports of mind-wandering during an experimental task..Conscious Cogn..2015,Vol.35 :136-142
- [3]程丽.(2+1)维非线性薛定谔方程的怪波解.长江大学学报(自然科学版).2016,第13卷 (第7期):35-39,4
- [4]Cheng, Li.Multiple wave solutions and auto-Bäcklund transformation for the ([formula omitted])-dimensional generalized B-type Kadomtsev–Petviashvili equation..Computers & Mathematics with Applications.2015,Vol.70 (No.5):765-775
- [5]张翼.消费不平等:资源支配逻辑和机会结构重塑.甘肃社会科学.2015 (第4期):1-7
- [6]Li Cheng.Grammian-type determinant solutions to generalized KP and BKP equations.Computers & Mathematics with Applications.2017,Vol.74 (No.4):727-735
- [7]Ye Q.Children's mental time travel during mind wandering..Front Psychol.2014,Vol.5 :927
- [8]Yi Zhang.Rational solutions to a KdV-like equation.Applied Mathematics and Computation.2015,Vol.256 :252-256
- [9]Zuqiang Su.Machinery running state identification based on discriminant semi-supervised local tangent space alignment for feature fusion and extraction.Measurement Science and Technology.2017,Vol.28 (No.5):055009
- [10]林晓珊.制度变迁与消费分层:消费不平等的一个分析视角.兰州大学学报(社会科学版).2014 (第1期):8-15
- [11]张翼.Riemann theta function periodic wave solutions for the variable-coefficient mKdV equation.中国物理B(英文版).2012,第21卷 (第12期):23-30
- [12]Li Cheng.A Wronskian formulation of the (3?+?1)-dimensional generalized BKP equation.Physica Scripta.2013,Vol.88 (No.1):015002
- [13]Xingxing Liu.Leaf characters of Ulmus elongata in fragmented habitats: Implications for conservation.Acta Ecologica Sinica.2017,Vol.37 (No.5):346-353
- [14]Li Cheng.Rational and complexiton solutions of the (3+1)-dimensional KP equation.Nonlinear Dynamics.2013,Vol.72 (No.3):605-613
- [15]Yi Zhang.A note on “The integrable KdV6 equation: Multiple soliton solutions and multiple singular soliton solutions”.Applied Mathematics and Computation.2009,Vol.214 (No.1):1-3
- [16]Zhang Yi.Rational and Periodic Wave Solutions of Two-Dimensional Boussinesq Equation.Communications in Theoretical Physics.2008,Vol.49 (No.4):815-824
- [17]Zhang, Yi.On the nonisospectral modified Kadomtsev–Peviashvili equation..Journal of Mathematical Analysis and Applications.2008,Vol.342 (No.1):534-541
- [18]Gendi Xu.Effects of organic acids on uptake of nutritional elements and Al forms in Brassica napus L. under Al stress as analyzed by<sup>27</sup>Al-NMR.Brazilian Journal of Botany.2016,Vol.39 (No.1):1-8
- [19]ZHANG.N-Soliron-like Solution of Ito Equation.理论物理通讯(英文版).2004 (第11期):641-644
- [20]Zhang, Y.The exact solutions to the complex KdV equation.Physics Letters. A.2007,Vol.367 (NO.6):465-472