An algebraic method exactly solving two high-dimensional nonlinear evolution equations

被引：0

作者：

Junqi, Hu ^{[1
]}

机构：

[1] Institute of Mathematics, Fudan University, Shanghai, China

来源：

Chaos Solitons Fractals | / 2卷 / 391-398期

关键词：

Compendex;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

Algebra - Functions - Mathematical transformations - Ordinary differential equations - Polynomials - Scattering - Set theory

引用

共 50 条

[21] Barycentric interpolation collocation methods for solving linear and nonlinear high-dimensional Fredholm integral equations
Liu, Hongyan
Huang, Jin
Pan, Yubin
Zhang, Jipei
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2018, 327 : 141 - 154
[22] BB: An R Package for Solving a Large System of Nonlinear Equations and for Optimizing a High-Dimensional Nonlinear Objective Function
Varadhan, Ravi
Gilbert, Paul D.
JOURNAL OF STATISTICAL SOFTWARE, 2009, 32 (04): : 1 - 26
[23] A Newton two-stage waveform relaxation method for solving systems of nonlinear algebraic equations
Salkuyeh, Davod Khojasteh
Hassanzadeh, Zeinab
MATHEMATICAL COMMUNICATIONS, 2015, 20 (01) : 1 - 15
[24] A method of solving algebraic equations
Ross, R
NATURE, 1908, 78 : 663 - 665
[25] A METHOD FOR SOLVING ALGEBRAIC EQUATIONS
MARKOV, S
KJURKCHIEV, N
ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND MECHANIK, 1989, 69 (04): : T106 - T107
[26] Two reliable methods for solving nonlinear evolution equations
Hajji, Mohamed Ali
Al-Khaled, Kamel
APPLIED MATHEMATICS AND COMPUTATION, 2007, 186 (02) : 1151 - 1162
[27] Application of Exp-function method to high-dimensional nonlinear evolution equation
Zhang, Sheng
CHAOS SOLITONS & FRACTALS, 2008, 38 (01) : 270 - 276
[28] Stochastic Methods for Solving High-Dimensional Partial Differential Equations
Billaud-Friess, Marie
Macherey, Arthur
Nouy, Anthony
Prieur, Clementine
MONTE CARLO AND QUASI-MONTE CARLO METHODS, MCQMC 2018, 2020, 324 : 125 - 141
[29] On Multilevel Picard Numerical Approximations for High-Dimensional Nonlinear Parabolic Partial Differential Equations and High-Dimensional Nonlinear Backward Stochastic Differential Equations
E, Weinan
Hutzenthaler, Martin
Jentzen, Arnulf
Kruse, Thomas
JOURNAL OF SCIENTIFIC COMPUTING, 2019, 79 (03) : 1534 - 1571
[30] On Multilevel Picard Numerical Approximations for High-Dimensional Nonlinear Parabolic Partial Differential Equations and High-Dimensional Nonlinear Backward Stochastic Differential Equations
Weinan E
Martin Hutzenthaler
Arnulf Jentzen
Thomas Kruse
Journal of Scientific Computing, 2019, 79 : 1534 - 1571

← 1 2 3 4 5 →