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A Scaled Boundary Finite-Element Method with B-Differentiable Equations for 3D Frictional Contact Problems

Binghan Xue, Xueming Du, Jing Wang, Xiang Yu

2022Fractal and Fractional26 citationsDOIOpen Access PDF

Abstract

Contact problems are among the most difficult issues in mathematics and are of crucial practical importance in engineering applications. This paper presents a scaled boundary finite-element method with B-differentiable equations for 3D frictional contact problems with small deformation in elastostatics. Only the boundaries of the contact system are discretized into surface elements by the scaled boundary finite-element method. The dimension of the contact system is reduced by one. The frictional contact conditions are formulated as B-differentiable equations. The B-differentiable Newton method is used to solve the governing equation of 3D frictional contact problems. The convergence of the B-differentiable Newton method is proven by the theory of mathematical programming. The two-block contact problem and the multiblock contact problem verify the effectiveness of the proposed method for 3D frictional contact problems. The arch-dam transverse joint contact problem shows that the proposed method can solve practical engineering problems. Numerical examples show that the proposed method is a feasible and effective solution for frictional contact problems.

Topics & Concepts

Finite element methodDiscretizationDifferentiable functionBoundary value problemMathematicsBoundary element methodMathematical analysisContact mechanicsBoundary (topology)Applied mathematicsStructural engineeringEngineeringContact Mechanics and Variational InequalitiesAdvanced Numerical Analysis TechniquesAdvanced Numerical Methods in Computational Mathematics