Unisolvent and minimal physical degrees of freedom for the second family of polynomial differential forms

Abstract

The principal aim of this work is to provide a family of unisolvent and minimal physical degrees of freedom, called weights, for N\'ed\'elec second family of finite elements. Such elements are thought of as differential forms Pr k (T) whose coefficients are polynomials of degree r . We confine ourselves in the two dimensional case R2 since it is easy to visualise and offers a neat and elegant treatment; however, we present techniques that can be extended to n > 2 with some adjustments of technical details. In particular, we use techniques of homological algebra to obtain degrees of freedom for the whole diagram Pr 0 (T) → Pr 1 (T) → Pr 2 (T), being T a 2-simplex of R2 . This work pairs its companions recently appeared for N\'ed\'elec first family of finite elements.

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