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111.
In this article, Lagrange interpolation by polynomials in several variables is studied. Particularly on the sufficiently intersected algebraic manifolds, we discuss the dimension about the interpolation space of polynomials. After defining properly posed set of nodes (or PPSN for short) along the sufficiently intersected algebraic manifolds, we prove the existence of PPSN and give the number of points in PPSN of any degree. Moreover, in order to compute the number of points in PPSN concretely, we propose the operator ? k with reciprocal difference. 相似文献
112.
A meshless model for transient heat conduction analyses of 3D axisymmetric functionally graded solids 总被引:1,自引:0,他引:1 下载免费PDF全文
A meshless numerical model is developed for analyzing transient heat conductions in three-dimensional (3D) axisymmetric continuously nonhomogeneous functionally graded materials (FGMs). Axial symmetry of geometry and boundary conditions reduces the original 3D initial-boundary value problem into a two-dimensional (2D) problem. Local weak forms are derived for small polygonal sub-domains which surround nodal points distributed over the cross section. In order to simplify the treatment of the essential boundary conditions, spatial variations of the temperature and heat flux at discrete time instants are interpolated by the natural neighbor interpolation. Moreover, the using of three-node triangular finite element method (FEM) shape functions as test functions reduces the orders of integrands involved in domain integrals. The semi-discrete heat conduction equation is solved numerically with the traditional two-point difference technique in the time domain. Two numerical examples are investigated and excellent results are obtained, demonstrating the potential application of the proposed approach. 相似文献
113.
In this paper we analyze the abstract parabolic evolutionary equations
114.
Newton-Thiele's rational interpolants 总被引:13,自引:0,他引:13
It is well known that Newton's interpolation polynomial is based on divided differences which produce useful intermediate
results and allow one to compute the polynomial recursively. Thiele's interpolating continued fraction is aimed at building
a rational function which interpolates the given support points. It is interesting to notice that Newton's interpolation polynomials
and Thiele's interpolating continued fractions can be incorporated in tensor‐product‐like manner to yield four kinds of bivariate
interpolation schemes. Among them are classical bivariate Newton's interpolation polynomials which are purely linear interpolants,
branched continued fractions which are purely nonlinear interpolants and have been studied by Chaffy, Cuyt and Verdonk, Kuchminska,
Siemaszko and many other authors, and Thiele-Newton's bivariate interpolating continued fractions which are investigated in
another paper by one of the authors. In this paper, emphasis is put on the study of Newton-Thiele's bivariate rational interpolants.
By introducing so‐called blending differences which look partially like divided differences and partially like inverse differences,
we give a recursive algorithm accompanied with a numerical example. Moreover, we bring out the error estimation and discuss
the limiting case.
This revised version was published online in June 2006 with corrections to the Cover Date. 相似文献
115.
首先,利用Riesz变换和内插理论的结果得到了非齐次A-调和方程d^*A(x,g+du)=d^*h很弱解的一个先验估计.然后,利用这个先验估计得到了该方程很弱解的高阶可积性. 相似文献
117.
118.
韩国强 《高校应用数学学报(A辑)》1994,(3)
本文我们讨论了矩形域上带连续边界条件的一类多元散乱数据最优插值。给出了某些情形插值的误差估计,误差估计表明在某些点上还具有超收敛性。 相似文献
119.
The Laguerre spectral and pseudospectral methods are investigated for multidimensional nonlinear partial differential equations. Some results on the modified Laguerre orthogonal approximation and interpolation are established, which play important roles in the related numerical methods for unbounded domains. As an example, the modified Laguerre spectral and pseudospectral methods are proposed for two-dimensional Logistic equation. The stability and convergence of the suggested schemes are proved. Numerical results demonstrate the high accuracy of these approaches. 相似文献
120.
Qianlong Liu 《国际流体数值方法杂志》2011,67(1):74-92
In this paper, a robust projection method on a locally refined mesh is proposed for two‐ and three‐dimensional viscous incompressible flows. The proposed method is robust not only when the interface between two meshes is located in a smooth flow region but also when the interface is located in a flow region with large gradients and/or strong unsteadiness. In numerical simulations, a locally refined mesh saves many grid points in regions of relatively small gradients compared with a uniform mesh. For efficiency and ease of implementation, we consider a two‐level blocked structure, for which both of the coarse and fine meshes are uniform Cartesian ones individually. Unfortunately, the introduction of the two‐level blocked mesh results in an important but difficult issue: coupling of the coarse and fine meshes. In this paper, by properly addressing the issue of the coupling, we propose a stable and accurate projection method on a locally refined staggered mesh for both two‐ and three‐dimensional viscous incompressible flows. The proposed projection method is based on two principles: the linear interpolation technique and the consistent discretization of both sides of the pressure Poisson equation. The proposed algorithm is straightforward owing to the linear interpolation technique, is stable and accurate, is easy to extend from two‐ to three‐dimensional flows, and is valid even when flows with large gradients cross the interface between the two meshes. The resulting pressure Poisson equation is non‐symmetric on a locally refined mesh. The numerical results for a series of exact solutions for 2D and 3D viscous incompressible flows verify the stability and accuracy of the proposed projection method. The method is also applied to some challenging problems, including turbulent flows around particles, flows induced by impulsively started/stopped particles, and flows induced by particles near solid walls, to test the stability and accuracy. Copyright © 2010 John Wiley & Sons, Ltd. 相似文献