On the unity of the constant strain/constant moment finite element methods

In this paper we consider the application of hierarchical functions to base approximations which are a partition of unity. The particular hierarchical functions used are added to base finite element interpolations which, for Co approximations, are a particular case of the partition of unity. We also

We derive inverse trace inequalities for hp-finite elements. Utilizing orthogonal polynomials, we show how to derive explicit expressions for the constants when considering triangular and tetrahedral elements. We also discuss how to generalize this technique to the general d-simplex.

element methods (PUFEM) Shepard functions Convolution partition of unity functions Condition numbers of stiffness matrices a b s t r a c t A partition of unity (PU) function is an essential component of the generalized finite element method (GFEM). The popular Shepard PU functions, which are rationa

Let µ m be the group of mth roots of unity. In this paper it is shown that if m is a prime power, then the number of all square matrices (of any order) over µ m with non-zero constant determinant or permanent is finite. If m is not a prime power, we construct an infinite family of matrices over µ m