Completeness of generating systems for quadratic splines on adaptively refined criss-cross triangulations

•Hierarchical Zwart–Powell elements are studied.•Sufficient conditions for algebraic completeness are given.•Construction uses decoupling and partial chessboard functions.•Characterization of linear dependencies is provided.

Hierarchical generating systems that are derived from Zwart–Powell (ZP) elements can be used to generate quadratic splines on adaptively refined criss-cross triangulations. We propose two extensions of these hierarchical generating systems, firstly decoupling the hierarchical ZP elements, and secondly enriching the system by including auxiliary functions. These extensions allow us to generate the entire   hierarchical spline space – which consists of all piecewise quadratic C1C1-smooth functions on an adaptively refined criss-cross triangulation – if the triangulation fulfills certain technical assumptions. Special attention is dedicated to the characterization of the linear dependencies that are present in the resulting enriched decoupled hierarchical generating system.