A three-dimensional quadratic nonconforming element

A new quadratic nonconforming finite element on rectangles (or parallelograms) is introduced. The nonconforming element consists of P 2 ⊕ Span{x 2 y, xy 2 } on a rectangle and eight degrees of freedom. Our element is essentially of seven degrees of freedom since the degree of freedom associated with

This paper presents an algorithm determining the invertibility of any planar, triangular auadratic isouarametric finite element transformation. Extensions of the algorithm to three-dimensibnal isoparametric finite element transformations yield guarantee invertibility of lo-node tetrahedra and g-nod

This paper presents an algorithm which determines the invertibility of any planar, triangular quadratic isoparametric finite element transformation. Extensions of the algorithm to three-dimensional isoparametric finite element transformations yield conditions which guarantee invertibility of 10-node