Gradient reproducing kernel particle method

Hashemian, Alireza; Shodja, H.M.

doi:10.2140/jomms.2008.3.127

Cited by 13 publications

(4 citation statements)

References 25 publications

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“…However, they are characterized by some numerical features that make them suitable for modeling strong discontinuities. Within this class, enriched Element-Free Galerkin formulation [Fleming et al, 1997], the Reproducing Kernel Particle Method [Liu et al, 1995;Klein et al, 2001;Boyce et al, 2014], the Gradient Reproducing Kernel Particle Method [Hashemian and Shodja, 2008], and smoothed-particle hydrodynamics [Batra and Zhang, 2004] are among the developed methods. A number of reviews regarding these methods can be found in [Belytschko et al, 1996;Liu et al, 1996Liu et al, , 1999Chen et al, 2011].…”

Section: Nomenclaturementioning

confidence: 99%

On numerical aspects of different updating schedules for tracking fracture path in strain localization modeling

Parvaneh

Foster

2016

Engineering Fracture Mechanics

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Section: Nomenclaturementioning

confidence: 99%

On numerical aspects of different updating schedules for tracking fracture path in strain localization modeling

Parvaneh

Foster

2016

Engineering Fracture Mechanics

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“…The commonly used meshless methods mainly include Smoothed Particle Hydrodynamic method (SPH), [30][31][32][33][34] moving least square approximation method (MLS), 35 and Reproducing Kernel Particle Method (RKPM). [36][37][38] RKPM has been applied to many large deformation problems, and it requires appropriate kernel support coverage of neighboring nodes to ensure kernel stable. A new reproducing kernel formulation with quasi-linear reproducing conditions, which overcomes the traditional large particle motion problem, was introduced by Yreux and Chen.…”

Section: Introductionmentioning

confidence: 99%

The nonlocal thermo‐hydro‐mechanical model for cracking behaviors of quasi‐brittle materials in the framework of advanced general particle dynamics

Zhou

Yao

et al. 2023

Fatigue Fract Eng Mat Struct

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A novel nonlocal thermo-hydro-mechanical coupling model is proposed to investigate cracking behaviors of quasi-brittle materials in the framework of advanced general particle dynamics (GPD). The nonlocal thermal conduction equation and the nonlocal flow diffusion equation are derived based on nonlocal vector calculus and the microscopic constitutive equation. Moreover, the coupling influences are considered based on the nonlocal equation and the coupling principle. The governing equation of the coupling system is established in the framework of GPD. The correctness of the proposed model is verified through comparing with the corresponding experimental data, and the numerical results are in good agreement with experimental results. Finally, the proposed model is applied to analyze the deformation and cracking behaviors of rock mass around tunnels, and the stress redistribution is revealed under thermo-hydro-mechanical coupling condition. K E Y W O R D S advanced general particle dynamics, cracking and mechanical behaviors of rock-like materials, nonlocal thermo-hydro-mechanical coupling model, nonlocal vector calculus Highlights • A novel nonlocal thermo-hydro-mechanical coupling model is proposed to investigate the cracking behaviors of rocks. • The nonlocal thermal conduction equation and the nonlocal flow diffusion equation are derived. • The governing equation of the coupling system is established in the framework of advanced general particle dynamics.

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“…Shodja and Hashemian , when dealing with beam‐column problems, noticed that the enforcement of derivative‐type essential boundary conditions in the context of the RKPM is troublesome. They proposed an incorporation of the first derivative of the function in the reproduction formula of the RKPM and named the method that evolved the Gradient RKPM . Li and Liu proposed a synchronized reproducing kernel interpolation method in which synchronized rates of convergence for the discrete functions and their derivatives can be turned.…”

Section: Introductionmentioning

confidence: 99%

Application of RKP‐FSM in the buckling and free vibration analysis of thin plates with abrupt thickness changes and internal supports

Khezri

Bradford

Vrcelj

2015

Numerical Meth Engineering

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A description is given of the development and use of the Reproducing Kernel Particle Finite Strip Method for the buckling and flexural vibration analysis of plates with intermediate supports and step thickness changes. The generalized 1-D shape functions of the Reproducing Kernel Particle Method replace the spline functions in the conventional spline finite strip method in the longitudinal direction. The structure of the generalized Reproducing Kernel Particle Method makes it a suitable tool for dealing with derivative-type essential boundary conditions, and its introduction in the finite strip method is beneficial for solving buckling and vibration problems for thin plates in which a number of the essential boundary conditions can include the first derivatives of the displacement function. Moreover, the modified corrected collocation method is further developed for the buckling and free vibration analysis of plates with abrupt thickness changes. This provides a versatile and powerful analysis capability which facilitates the analysis of problems including plate structures with abrupt thickness changes of its component plates. The application of the proposed technique for the treatment of discontinuities and the enforcement of the internal support conditions are illustrated with a series of numerical examples.

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Gradient reproducing kernel particle method

Cited by 13 publications

References 25 publications

On numerical aspects of different updating schedules for tracking fracture path in strain localization modeling

On numerical aspects of different updating schedules for tracking fracture path in strain localization modeling

The nonlocal thermo‐hydro‐mechanical model for cracking behaviors of quasi‐brittle materials in the framework of advanced general particle dynamics

Application of RKP‐FSM in the buckling and free vibration analysis of thin plates with abrupt thickness changes and internal supports

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