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DISCONTINUOUS GALERKIN METHOD FOR NONLINEAR QUASI-STATIC POROELASTICITY PROBLEMS SCIE
期刊论文 | 2024 , 21 (2) , 201-220 | INTERNATIONAL JOURNAL OF NUMERICAL ANALYSIS AND MODELING
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Abstract :

This paper is devoted to a discontinuous Galerkin (DG) method for nonlinear quasistatic poroelasticity problems. The fully implicit nonlinear numerical scheme is constructed by utilizing DG method for the spatial approximation and the backward Euler method for the temporal discretization. The existence and uniqueness of the numerical solution is proved. Then we derive the optimal convergence order estimates in a discrete H1 norm for the displacement and in H1 and L2 norms for the pressure. Finally, numerical experiments are supplied to validate the theoretical error estimates of our proposed method.

Keyword :

Nonlinear quasi-static poroelasticity problem Nonlinear quasi-static poroelasticity problem optimal convergence order estimate optimal convergence order estimate fully implicit nonlinear numerical scheme fully implicit nonlinear numerical scheme discontinuous Galerkin method discontinuous Galerkin method

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GB/T 7714 Chen, Fan , Cui, Ming , Zhou, Chenguang . DISCONTINUOUS GALERKIN METHOD FOR NONLINEAR QUASI-STATIC POROELASTICITY PROBLEMS [J]. | INTERNATIONAL JOURNAL OF NUMERICAL ANALYSIS AND MODELING , 2024 , 21 (2) : 201-220 .
MLA Chen, Fan 等. "DISCONTINUOUS GALERKIN METHOD FOR NONLINEAR QUASI-STATIC POROELASTICITY PROBLEMS" . | INTERNATIONAL JOURNAL OF NUMERICAL ANALYSIS AND MODELING 21 . 2 (2024) : 201-220 .
APA Chen, Fan , Cui, Ming , Zhou, Chenguang . DISCONTINUOUS GALERKIN METHOD FOR NONLINEAR QUASI-STATIC POROELASTICITY PROBLEMS . | INTERNATIONAL JOURNAL OF NUMERICAL ANALYSIS AND MODELING , 2024 , 21 (2) , 201-220 .
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Unconditional Superconvergence Analysis of Energy Conserving Finite Element Methods for the Nonlinear Coupled Klein-Gordon Equations SCIE
期刊论文 | 2023 , 15 (3) , 602-622 | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS
WoS CC Cited Count: 3
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Abstract :

In this paper, we consider the energy conserving numerical scheme for cou-pled nonlinear Klein-Gordon equations. We propose energy conserving finite element method and get the unconditional superconvergence result O(h2+Delta t2) by using the er-ror splitting technique and postprocessing interpolation. Numerical experiments are carried out to support our theoretical results.

Keyword :

the nonlinear coupled Klein-Gordon equations the nonlinear coupled Klein-Gordon equations finite element method finite element method unconditional superconvergence result unconditional superconvergence result Energy conserving Energy conserving postprocessing interpolation postprocessing interpolation

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GB/T 7714 Cui, Ming , Li, Yanfei , Yao, Changhui . Unconditional Superconvergence Analysis of Energy Conserving Finite Element Methods for the Nonlinear Coupled Klein-Gordon Equations [J]. | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS , 2023 , 15 (3) : 602-622 .
MLA Cui, Ming 等. "Unconditional Superconvergence Analysis of Energy Conserving Finite Element Methods for the Nonlinear Coupled Klein-Gordon Equations" . | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS 15 . 3 (2023) : 602-622 .
APA Cui, Ming , Li, Yanfei , Yao, Changhui . Unconditional Superconvergence Analysis of Energy Conserving Finite Element Methods for the Nonlinear Coupled Klein-Gordon Equations . | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS , 2023 , 15 (3) , 602-622 .
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A Modified Weak Galerkin Finite Element Method for the Biharmonic Equation on Polytopal Meshes
期刊论文 | 2021 , 3 (1) , 91-105 | COMMUNICATIONS ON APPLIED MATHEMATICS AND COMPUTATION
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Abstract :

A modified weak Galerkin (MWG) finite element method is developed for solving the biharmonic equation. This method uses the same finite element space as that of the discontinuous Galerkin method, the space of discontinuous polynomials on polytopal meshes. But its formulation is simple, symmetric, positive definite, and parameter independent, without any of six inter-element face-integral terms in the formulation of the discontinuous Galerkin method. Optimal order error estimates in a discrete H2 norm are established for the corresponding finite element solutions. Error estimates in the L2 norm are also derived with a sub-optimal order of convergence for the lowest-order element and an optimal order of convergence for all high-order of elements. The numerical results are presented to confirm the theory of convergence.

Keyword :

Biharmonic equations Biharmonic equations 65N15 65N15 76D07 76D07 Weak Laplacian Weak Laplacian Finite element methods Finite element methods 65N30 65N30 Polytopal meshes Polytopal meshes

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GB/T 7714 Cui, Ming , Ye, Xiu , Zhang, Shangyou . A Modified Weak Galerkin Finite Element Method for the Biharmonic Equation on Polytopal Meshes [J]. | COMMUNICATIONS ON APPLIED MATHEMATICS AND COMPUTATION , 2021 , 3 (1) : 91-105 .
MLA Cui, Ming 等. "A Modified Weak Galerkin Finite Element Method for the Biharmonic Equation on Polytopal Meshes" . | COMMUNICATIONS ON APPLIED MATHEMATICS AND COMPUTATION 3 . 1 (2021) : 91-105 .
APA Cui, Ming , Ye, Xiu , Zhang, Shangyou . A Modified Weak Galerkin Finite Element Method for the Biharmonic Equation on Polytopal Meshes . | COMMUNICATIONS ON APPLIED MATHEMATICS AND COMPUTATION , 2021 , 3 (1) , 91-105 .
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A Modified Weak Galerkin Finite Element Method for the Biharmonic Equation on Polytopal Meshes
期刊论文 | 2021 , 3 (1) , 91-105 | 应用数学与计算数学学报
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Abstract :

A modified weak Galerkin (MWG) finite element method is developed for solving the biharmonic equation.This method uses the same finite element space as that of the discontinuous Galerkin method,the space of discontinuous polynomials on polytopal meshes.But its formulation is simple,symmetric,positive definite,and parameter independent,without any of six inter-element face-integral terms in the formulation of the discontinuous Galerkin method.Optimal order error estimates in a discrete H2 norm are established for the corresponding finite element solutions.Error estimates in the L2 norm are also derived with a sub-optimal order of convergence for the lowest-order element and an optimal order of convergence for all high-order of elements.The numerical results are presented to confirm the theory of convergence.

Keyword :

Weak Laplacian Weak Laplacian Biharmonic equations Biharmonic equations Polytopal meshes Polytopal meshes Finite element methods Finite element methods

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GB/T 7714 Ming Cui , Xiu Ye , Shangyou Zhang . A Modified Weak Galerkin Finite Element Method for the Biharmonic Equation on Polytopal Meshes [J]. | 应用数学与计算数学学报 , 2021 , 3 (1) : 91-105 .
MLA Ming Cui 等. "A Modified Weak Galerkin Finite Element Method for the Biharmonic Equation on Polytopal Meshes" . | 应用数学与计算数学学报 3 . 1 (2021) : 91-105 .
APA Ming Cui , Xiu Ye , Shangyou Zhang . A Modified Weak Galerkin Finite Element Method for the Biharmonic Equation on Polytopal Meshes . | 应用数学与计算数学学报 , 2021 , 3 (1) , 91-105 .
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High-order characteristic-finite volume methods for aerosol dynamic equations SCIE
期刊论文 | 2020 , 370 | JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
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Abstract :

Aerosol particles have an important effect on changing of climate and human health, where aerosols scatter and absorb the incoming solar radiation, and thus decrease the precipitation efficiency of warm clouds and can cause an indirect radiative forcing associated with changes in cloud properties. Meanwhile, it has also been recognized that the particles of aerosols in the sub-micrometer size range can be inhaled and thus pose certain health hazards. In this paper we analyze the finite volume method based on linear interpolation and Hermite interpolation combined with the method of characteristics for the nonlinear aerosol dynamic equations on time and particle size, which involve the advection process, condensation process and the nonlinear coagulation process. Numerical experiments for the multiple log-normal aerosol distributions are further given to confirm the theoretical results. (C) 2019 Elsevier B.V. All rights reserved.

Keyword :

Finite volume method Finite volume method The method of characteristics The method of characteristics Aerosol dynamic equation Aerosol dynamic equation Error estimate Error estimate

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GB/T 7714 Cui, Ming , Li, Fangxia , Liang, Dong . High-order characteristic-finite volume methods for aerosol dynamic equations [J]. | JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS , 2020 , 370 .
MLA Cui, Ming 等. "High-order characteristic-finite volume methods for aerosol dynamic equations" . | JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS 370 (2020) .
APA Cui, Ming , Li, Fangxia , Liang, Dong . High-order characteristic-finite volume methods for aerosol dynamic equations . | JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS , 2020 , 370 .
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On the Uniform Convergence of the Weak Galerkin Finite Element Method for a Singularly-Perturbed Biharmonic Equation SCIE
期刊论文 | 2020 , 82 (1) | JOURNAL OF SCIENTIFIC COMPUTING
WoS CC Cited Count: 36
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Abstract :

For the biharmonic equation or this singularly-perturbed biharmonic equation, lower order nonconforming finite elements are usually used. It is difficult to construct high order C1 conforming, or nonconforming elements, especially in 3D. A family of any quadratic or higher order weak Galerkin finite elements is constructed on 2D polygonal grids and 3D polyhedral grids for solving the singularly-perturbed biharmonic equation. The optimal order of convergence, up to any order the smooth solution can have, is proved for this method, in a discrete H-2 norm. Under a full elliptic regularity H-4 assumption, the L-2 convergence achieves the optimal order as well, in 2D and 3D. Numerical tests are presented verifying the theory.

Keyword :

Polyhedral grid Polyhedral grid Biharmonic equation Biharmonic equation Weak Galerkin Weak Galerkin Singular perturbation Singular perturbation Polygonal grid Polygonal grid Finite element Finite element

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GB/T 7714 Cui, Ming , Zhang, Shangyou . On the Uniform Convergence of the Weak Galerkin Finite Element Method for a Singularly-Perturbed Biharmonic Equation [J]. | JOURNAL OF SCIENTIFIC COMPUTING , 2020 , 82 (1) .
MLA Cui, Ming 等. "On the Uniform Convergence of the Weak Galerkin Finite Element Method for a Singularly-Perturbed Biharmonic Equation" . | JOURNAL OF SCIENTIFIC COMPUTING 82 . 1 (2020) .
APA Cui, Ming , Zhang, Shangyou . On the Uniform Convergence of the Weak Galerkin Finite Element Method for a Singularly-Perturbed Biharmonic Equation . | JOURNAL OF SCIENTIFIC COMPUTING , 2020 , 82 (1) .
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Optical characteristic and application of CH3NH3Pbi3 thin film in Schottky diode Scopus
会议论文 | 2016 , 848 , 440-445 | Chinese Materials Congress on Functional and Functionally Structured Materials, CMC 2015
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Abstract :

CH3NH3PbI3 thin film was deposited by a dual-source evaporation system under high vacuum (∼10−4 Pa). The crystallographic phase was analyzed by X-ray diffraction and confirmed as the perovskite structure. The optical properties of the thin film have been investigated in the spectral range 300-1800 nm. The analysis of the absorption coefficient (α) reveals direct allowed transition with corresponding energy 1.58 eV. The surface morphology of the film was characterized by atomic force microscopy (AFM). The observed features exhibited by CH3NH3PbI3 give a vital chance to explore its application for various optoelectronic devices. To see its other potential utility, Al/CH3NH3PbI3 /ITO Schottky diodes were fabricated. Based on the analyzing the I-V measurement for the Al/CH3NH3PbI3/ ITO device, the basic device parameters such as barrier height and ideality factor were determined. At the low-voltage region, the current conduction in the device is ohmic type. The charge transport phenomenon appears to be space charge limited current (SCLC) at higher-voltage regions. © 2016 Trans Tech Publications, Switzerland.

Keyword :

Annealing; CH3NH3PbI3; Perovskite; Schottky diode Annealing; CH3NH3PbI3; Perovskite; Schottky diode

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GB/T 7714 Chen, L. , Deng, J.X. , Gao, H.L. et al. Optical characteristic and application of CH3NH3Pbi3 thin film in Schottky diode [C] . 2016 : 440-445 .
MLA Chen, L. et al. "Optical characteristic and application of CH3NH3Pbi3 thin film in Schottky diode" . (2016) : 440-445 .
APA Chen, L. , Deng, J.X. , Gao, H.L. , Yang, Q.Q. , Kong, L. , Cui, M. et al. Optical characteristic and application of CH3NH3Pbi3 thin film in Schottky diode . (2016) : 440-445 .
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High-Order Finite Volume Methods for Aerosol Dynamic Equations SCIE
期刊论文 | 2016 , 8 (2) , 213-235 | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS
WoS CC Cited Count: 4
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Abstract :

Aerosol modeling is very important to study the behavior of aerosol dynamics in atmospheric environment. In this paper we consider numerical methods for the nonlinear aerosol dynamic equations on time and particle size. The finite volume element methods based on the linear interpolation and Hermite interpolation are provided to approximate the aerosol dynamic equation where the condensation and removal processes are considered. Numerical examples are provided to show the efficiency of these numerical methods.

Keyword :

Aerosol dynamic equation Aerosol dynamic equation removal removal finite volume method finite volume method condensation condensation

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GB/T 7714 Cui, Ming , Su, Yanxin , Liang, Dong . High-Order Finite Volume Methods for Aerosol Dynamic Equations [J]. | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS , 2016 , 8 (2) : 213-235 .
MLA Cui, Ming et al. "High-Order Finite Volume Methods for Aerosol Dynamic Equations" . | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS 8 . 2 (2016) : 213-235 .
APA Cui, Ming , Su, Yanxin , Liang, Dong . High-Order Finite Volume Methods for Aerosol Dynamic Equations . | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS , 2016 , 8 (2) , 213-235 .
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Adjoint-free calculation method for conditional nonlinear optimal perturbations SCIE CSCD
期刊论文 | 2015 , 58 (7) , 1567-1576 | SCIENCE CHINA-MATHEMATICS
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Abstract :

Adjoint-free calculation method is proposed to compute conditional nonlinear optimal perturbations (CNOP) combined with initial perturbations and model parameter perturbations. The new approach avoids the use of adjoint technique in the optimization process. CNOPs respectively generated by ensemble-based and adjoint-based methods are compared based on a simple theoretical model.

Keyword :

ensemble-based method ensemble-based method adjoint method adjoint method conditional nonlinear optimal perturbation (CNOP) conditional nonlinear optimal perturbation (CNOP)

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GB/T 7714 Cui Ming . Adjoint-free calculation method for conditional nonlinear optimal perturbations [J]. | SCIENCE CHINA-MATHEMATICS , 2015 , 58 (7) : 1567-1576 .
MLA Cui Ming . "Adjoint-free calculation method for conditional nonlinear optimal perturbations" . | SCIENCE CHINA-MATHEMATICS 58 . 7 (2015) : 1567-1576 .
APA Cui Ming . Adjoint-free calculation method for conditional nonlinear optimal perturbations . | SCIENCE CHINA-MATHEMATICS , 2015 , 58 (7) , 1567-1576 .
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THE TIME SECOND-ORDER CHARACTERISTIC FEM FOR NONLINEAR MULTICOMPONENT AEROSOL DYNAMIC EQUATIONS IN ENVIRONMENT SCIE
期刊论文 | 2015 , 12 (2) , 211-229 | INTERNATIONAL JOURNAL OF NUMERICAL ANALYSIS AND MODELING
WoS CC Cited Count: 4
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Abstract :

An efficient time second-order characteristic finite element method for solving the nonlinear multi-component aerosol dynamic equations is developed. While a highly accurate characteristic method is used to treat the advection multi-component condensation/evaporation process, a time high-order extrapolation along the characteristics is applied to approximate the nonlinear multi-component coagulation terms. The scheme is of second order accuracy in time for the multi-component problems. We study the theoretical analysis and obtain the time second-order error estimate of the scheme. Numerical experiments are further given to confirm the theoretical results. The dynamic behaviours of multi-component aerosol distributions are also simulated for the multi-component aerosol problems of aerosol water, black carbon and sulfate components with different tri-modal log-normal initial distributions.

Keyword :

Multi-component aerosol dynamic equations Multi-component aerosol dynamic equations characteristic extrapolation characteristic extrapolation condensation/evaporation condensation/evaporation characteristic method characteristic method nonlinear coagulation nonlinear coagulation error estimate error estimate

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GB/T 7714 Fu, Kai , Liang, Dong , Wang, Wenqia et al. THE TIME SECOND-ORDER CHARACTERISTIC FEM FOR NONLINEAR MULTICOMPONENT AEROSOL DYNAMIC EQUATIONS IN ENVIRONMENT [J]. | INTERNATIONAL JOURNAL OF NUMERICAL ANALYSIS AND MODELING , 2015 , 12 (2) : 211-229 .
MLA Fu, Kai et al. "THE TIME SECOND-ORDER CHARACTERISTIC FEM FOR NONLINEAR MULTICOMPONENT AEROSOL DYNAMIC EQUATIONS IN ENVIRONMENT" . | INTERNATIONAL JOURNAL OF NUMERICAL ANALYSIS AND MODELING 12 . 2 (2015) : 211-229 .
APA Fu, Kai , Liang, Dong , Wang, Wenqia , Cui, Ming . THE TIME SECOND-ORDER CHARACTERISTIC FEM FOR NONLINEAR MULTICOMPONENT AEROSOL DYNAMIC EQUATIONS IN ENVIRONMENT . | INTERNATIONAL JOURNAL OF NUMERICAL ANALYSIS AND MODELING , 2015 , 12 (2) , 211-229 .
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