摘要
基于参考元的构造和双线性变换 ,本文给出了一个任意窄四边形类Wilson元 .利用窄四边形等参有限元的插值定理和有关方法 ,当正则性条件 ρK/hK ≥σ0 >0不满足时 ,得到了任意窄四边形类Wilson元的插值误差 ,其中hK 为单元K的直径 ,ρK 为K中内切圆的直径 .如果被插函数属于H2 (K) ,在L2 (K)模下的插值误差为O(h2 K) ,在H1 (K)模下的误差为O(hK)。
Based on the construction of reference e le ment and bilinear transformation, a quasi-Wilson element for arbitrary narrow q uadrilateral is presented. Using the interpolation Theorem for narrow quadrilate ral isoparametric finite element and related methods, the bounds of interpolatio n error for arbitrary narrow quadrilateral quasi-Wilson element are obtained in case when the condition ρ K/h K≥σ 0>0 is not satisfied, where h K is the diameter of the element K and ρ K is the diameter of an ins cribed circle in K. The interpolation error is O(h2 K) in the L2( K)-norm and O(h K) in the H1(K) -norm provided that the in terpolated function belongs to H2(K).
基金
SupportedbytheNaturalScienceFoundationofHenanProvince(9940 5 2 60 0 )