2. 您的位置
3. 首页
4. 会议论文
5. Conforming and nonconforming virtual element method for the time fractional reaction-subdiffusion eq

Conforming and nonconforming virtual element method for the time fractional reaction-subdiffusion eq

来源 :第十六届全国微分方程数值方法暨第十三届全国仿真算法学术会议 | 被引量 : 0次 | 上传用户：lfw_1988

【摘 要】

：

　　We consider the conforming and nonconforming virtual element method(VEM)for the approximation of the time fractional reaction-subdiffusion equation involvin

【作 者】

：

李猛 赵纪坤 黄乘明 陈绍春 

【机 构】

：

郑州大学,河南省郑州市,450001华中科技大学,湖北省武汉市,430074

【出 处】

：

第十六届全国微分方程数值方法暨第十三届全国仿真算法学术会议

【发表日期】

：

2019年8期

下载到本地 , 更方便阅读

下载此文 赞助VIP

声明 : 本文档内容版权归属内容提供方 , 如果您对本文有版权争议 , 可与客服联系进行内容授权或下架

论文部分内容阅读

　　We consider the conforming and nonconforming virtual element method(VEM)for the approximation of the time fractional reaction-subdiffusion equation involving the Caputo fractional derivative.

其他文献

Trigonometrically fitted two-derivative Runge-Kutta-Nystr(o)m methods for second-order oscillatory d

　　Order conditions for two-derivative Runge-Kutta-Nystr(o)m(TDRKN)methods are obtained via the Nystr(o)m tree theory and the B-series theory.Trigonometric fit

会议

Two-derivative Runge-Kutta-Nystr"ommethodNystr"{o}m treeB-seriesOrder conditi

Structure-preserving stochastic conformal exponential integrator for linearly damped stochastic diff

　　In this paper,we study the linearly damped stochastic differential equations,which have the invariants satisfying a linear differential equation whose coeff

会议

Damped stochastic differential equationsConformal invariantConformal symplecti

Oscillation-Preserving Integrators for Second-Order ODEs with Highly Oscillatory Solutions

　　In the last few decades,Runge-Kutta-Nystr"om(RKN) methods have made significant progress and the study of RKN-type methods for solving highly oscillatory d

会议

弱奇性Volterra积分微分方程的谱配置法

　　本文考察了弱奇性Volterra 积分微分方程的谱配置法，并对该方法进行了收敛性分析，分析结果表面，误差收敛阶依赖于方程解函数的正则性，我们也用数值实验证实了这一结论。本文

会议

弱奇性Volterra积分微分方程谱配置法收敛性分析数值实验

Structure-preserving integrators based on continuous-stage Runge-Kutta-Nystr(o)m methods

　　In this talk,we develop continuous-stage Runge–Kutta–Nystr(o)m(csRKN)methods for numerical integration of second-order differential equations.

会议

Continuous-stage Runge-Kutta-Nystr(o)m methodsHamiltonian systemsSymplectic in

Explicit θ-schemes for mean-field backward stochastic differential equations

　　In this work,we propose a class of explicit θ-schemes for solving mean-field backward stochastic differential equations.

会议

mean-field backward stochastic differential equationθ-schemeserror estimates

A survey of popular PinT algorithmswaveform relaxation,parareal,MGRIT,ParaEXP,Laplace inversion,Diag

　　Recent research for parallel numerics of time-dependent PDEs provokes fast growing interest for the study of parallel-in-time(PinT)algorithms,because in man

会议

PinT algorithmspararealMGRITLapalce inversionDiagonalization

Finite element methods and their error analysis for SPDEs driven by Gaussian and non-Gaussian noises

　　This talk is divided into two parts.In the first part we consider strong convergence of semidiscrete finite element method for stochastic partial differenti

会议

stochastic partial differential equationsfinite element methodlinear implicit

Collocation methods for Volterra functional integral equations with proportional delays

　　In this talk,we develop a new technique to study the optimal convergence orders of collocation methods for Volterra functional integral equations with vanis

会议

Volterra functional integral equationsVanishing delaysCollocation methods Quas

一种用于求解泊松玻尔兹曼溶剂化模型的区域分解方法

　　在量子化学中，泊松玻尔兹曼溶剂化模型有着广泛的应用。本文提出一种特殊的区域球状分解方法，用于快速求解线性泊松玻尔兹曼方程。

会议

泊松玻尔兹曼方程区域分解法谱方法