Add to ORKGAbstract: Straight-forward systematic deriva-tions of the weakly singular boundary integral equations (BIEs) are presented, following the simple and directly-derived approach by Okada, Rajiyah, and Atluri (1989b) and Han and Atluri (2002). A set of weak-forms and their algebraic combinations have been used to avoid the hyper-singularities, by directly applying the “intrinsic properties ” of the fundamental solutions. The systematic decomposition of the kernel functions of BIEs is presented for regularizing the BIEs. The present approach is general, and is applied to developing weakly-singular BIEs for solids and acoustics successfully
tial equation, in conjunction with vector test-functions (which are gradients of the fundamental sol...
In this article the methodology for divergent integral regularization developed in [8] is applied fo...
The boundary integral equation (BIE) method has been used more and more in the last 20 years for sol...
This article considers weakly singular, singular and hypersingular integrals, which arise when the b...
This article considers weakly singular, singular and hypersingular integrals, which arise when the b...
This article considers weakly singular, singular and hypersingular integrals, which arise when the b...
A weak formulation for ‘direct’ boundary methods, deduced from distribution theory, is presented. Th...
The boundary integral equation/boundary element method (BIE/BEM) has emerged as a powerful alternati...
The boundary integral equation/boundary element method (BIE/BEM) has emerged as a powerful alternati...
Abstract: Using the directly derived non-hyper singu-lar integral equations for displacement gradien...
Accurate numerical evaluation of boundary integrals is fundamental to producing useful results with ...
Abstract: Novel non-hyper-singular [i.e., only strongly-singular] boundary-integral-equations for th...
Abstract: To predict the sound field in an acoustic problem, the well-known non-uniqueness problem h...
This article considers weakly singular, singular and hypersingular integrals, which arise when the b...
In this article the methodology for divergent integral regularization developed in [9] is applied fo...
tial equation, in conjunction with vector test-functions (which are gradients of the fundamental sol...
In this article the methodology for divergent integral regularization developed in [8] is applied fo...
The boundary integral equation (BIE) method has been used more and more in the last 20 years for sol...
This article considers weakly singular, singular and hypersingular integrals, which arise when the b...
This article considers weakly singular, singular and hypersingular integrals, which arise when the b...
This article considers weakly singular, singular and hypersingular integrals, which arise when the b...
A weak formulation for ‘direct’ boundary methods, deduced from distribution theory, is presented. Th...
The boundary integral equation/boundary element method (BIE/BEM) has emerged as a powerful alternati...
The boundary integral equation/boundary element method (BIE/BEM) has emerged as a powerful alternati...
Abstract: Using the directly derived non-hyper singu-lar integral equations for displacement gradien...
Accurate numerical evaluation of boundary integrals is fundamental to producing useful results with ...
Abstract: Novel non-hyper-singular [i.e., only strongly-singular] boundary-integral-equations for th...
Abstract: To predict the sound field in an acoustic problem, the well-known non-uniqueness problem h...
This article considers weakly singular, singular and hypersingular integrals, which arise when the b...
In this article the methodology for divergent integral regularization developed in [9] is applied fo...
tial equation, in conjunction with vector test-functions (which are gradients of the fundamental sol...
In this article the methodology for divergent integral regularization developed in [8] is applied fo...
The boundary integral equation (BIE) method has been used more and more in the last 20 years for sol...