Universal Journal of Mechanical Engineering Vol. 2(1), pp. 20 - 27
DOI: 10.13189/ujme.2014.020103
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Benefits of Using Non-consolidated Domain Influence in Meshless Local Petrov-galerkin (Mlpg) Method for Solving Lefm Problems

Hashim N. Al-Mahmud , Haider K. Mehbes , Ameen A. Nassar ^*
Mechanical Engineering Department, College of Engineering, University of Basrah

ABSTRACT

This paper presents an efficient meshless method in the formulation of the weak form of local Petrov-Galerkin method MLPG. The formulation is carried out by using an elliptic domain rather than conventional isotropic domain of influence. Therefore, the method involves an MLPG formulation in conjunction with an anisotropic weight function. In the elliptic weight function, each node has three characteristic indicated that were major radius, inner radius, and the direction of the local domain. Furthermore, the space that will be covered by the elliptical domain will be less than the area of the circle (isotropic) at the same main diameter. This means leaving many points of integration are not necessary. Therefore, the computational cost will be decreased. MLPG method with the elliptical domain is used in solving problems of linear elastic fracture mechanism LEFM. MATLAB and Fortran codes are used for obtaining the results of this research .The results were compared with those presented in the literature which shows a reduction in the computational cost up to 15%, and an error criteria enhancement up to 25%.

KEYWORDS
Meshless Methods, Local Petrov-Galerkin Method MLPG, Elliptic Domain

Cite This Paper in IEEE or APA Citation Styles
(a). IEEE Format:
[1] Hashim N. Al-Mahmud , Haider K. Mehbes , Ameen A. Nassar , "Benefits of Using Non-consolidated Domain Influence in Meshless Local Petrov-galerkin (Mlpg) Method for Solving Lefm Problems," Universal Journal of Mechanical Engineering, Vol. 2, No. 1, pp. 20 - 27, 2014. DOI: 10.13189/ujme.2014.020103.

(b). APA Format:
Hashim N. Al-Mahmud , Haider K. Mehbes , Ameen A. Nassar (2014). Benefits of Using Non-consolidated Domain Influence in Meshless Local Petrov-galerkin (Mlpg) Method for Solving Lefm Problems. Universal Journal of Mechanical Engineering, 2(1), 20 - 27. DOI: 10.13189/ujme.2014.020103.