Presents a way to construct orthogonal piece-wise polynomials on an arbitrary triangular domain via barycentric coordinates. Solution of a boundary value problem for Laplace equation; Methodology; Results and discussion.
In this paper, we propose a new set of orthogonal basis functions in the arbitrarytriangular domain. At first, we generalize the 1-D Sturm-Liouville equation tothe arbitrary triangular domain on a barycentric coordina...In this paper, we propose a new set of orthogonal basis functions in the arbitrarytriangular domain. At first, we generalize the 1-D Sturm-Liouville equation tothe arbitrary triangular domain on a barycentric coordinate, and derive a set ofcomplete orthogonal basis functions on this domain. Secondly, we analyze thesymmetry and periodicity property of these functions and classify them into fourclasses. At last, we show some of the visualization results of these basis functions.展开更多
基金Project supported by the Major Basic Project of China (No.G19990328) and National Natural ScienceFoundation of China.
文摘Presents a way to construct orthogonal piece-wise polynomials on an arbitrary triangular domain via barycentric coordinates. Solution of a boundary value problem for Laplace equation; Methodology; Results and discussion.
文摘In this paper, we propose a new set of orthogonal basis functions in the arbitrarytriangular domain. At first, we generalize the 1-D Sturm-Liouville equation tothe arbitrary triangular domain on a barycentric coordinate, and derive a set ofcomplete orthogonal basis functions on this domain. Secondly, we analyze thesymmetry and periodicity property of these functions and classify them into fourclasses. At last, we show some of the visualization results of these basis functions.