Convergence of Adaptive Mixed Finite Element Methods for the Hodge Laplacian Equation: without harmonic forms
Provides theoretical convergence guarantees for adaptive FEEC methods, addressing a gap in the analysis for Hodge Laplacian problems without harmonic forms.
The paper proves uniform convergence of adaptive mixed finite element methods for Hodge Laplacian equations without harmonic forms, using a residual-type posteriori error estimate and an additional marking strategy to ensure quasi-orthogonality.
Finite element exterior calculus (FEEC) has been developed as a systematical framework for constructing and analyzing stable and accurate numerical method for partial differential equations by employing differential complexes. This paper is devoted to analyze convergence of adaptive mixed finite element methods for Hodge Laplacian equations based on FEEC without considering harmonic forms. More precisely, a residual type posteriori error estimates is obtained by using the Hodge decomposition, the regular decomposition and bounded commuting quasi-interpolants. An additional marking strategy is added to ensure the quasi-orthogonality. Using this quasi-orthogonality, the uniform convergence of adaptive mixed finite element methods is obtained without assuming the initial mesh size is small enough.