TY - JOUR

T1 - Nonlocal operator method with numerical integration for gradient solid

AU - Ren, Huilong

AU - Zhuang, Xiaoying

AU - Rabczuk, Timon

N1 - Funding Information: The first author acknowledges the support from the COMBAT Program ( Computational Modeling and Design of Lithium-ion Batteries , Grant No. 615132 ).

PY - 2020/6

Y1 - 2020/6

N2 - The nonlocal operator method (NOM) is initially proposed as a particle-based method, which has difficulties in imposing accurately the boundary conditions of various orders. In this paper, we converted the particle-based NOM into a scheme with approximation property. The new scheme describes partial derivatives of various orders at a point by the nodes in the support and takes advantage of the background mesh for numerical integration. The boundary conditions are enforced via the modified variational principle. The particle-based NOM can be viewed as a special case of NOM with approximation property when nodal integration is used. The scheme based on numerical integration greatly improves the stability of the method. As a consequence, the requirement of the operator energy functional in particle-based NOM is avoided. We demonstrate the capabilities of the proposed method by solving gradient elasticity problems and comparing the numerical results with exact solutions.

AB - The nonlocal operator method (NOM) is initially proposed as a particle-based method, which has difficulties in imposing accurately the boundary conditions of various orders. In this paper, we converted the particle-based NOM into a scheme with approximation property. The new scheme describes partial derivatives of various orders at a point by the nodes in the support and takes advantage of the background mesh for numerical integration. The boundary conditions are enforced via the modified variational principle. The particle-based NOM can be viewed as a special case of NOM with approximation property when nodal integration is used. The scheme based on numerical integration greatly improves the stability of the method. As a consequence, the requirement of the operator energy functional in particle-based NOM is avoided. We demonstrate the capabilities of the proposed method by solving gradient elasticity problems and comparing the numerical results with exact solutions.

KW - Gradient solid

KW - Modified variational principle

KW - Nonlocal operator method

KW - Numerical integration

KW - Peridynamics

UR - http://www.scopus.com/inward/record.url?scp=85081666435&partnerID=8YFLogxK

U2 - 10.1016/j.compstruc.2020.106235

DO - 10.1016/j.compstruc.2020.106235

M3 - Article

AN - SCOPUS:85081666435

VL - 233

JO - Computers and Structures

JF - Computers and Structures

SN - 0045-7949

M1 - 106235

ER -