Optimality of adaptive H(divdiv) mixed finite element methods for the Kirchhoff-Love plate bending problem

Abstract

This paper presents a reliable and efficient residual-based a posteriori error analysis for the symmetric H(divdiv) mixed finite element method for the Kirchhoff-Love plate bending problem with mixed boundary conditions. The key ingredient lies in the construction of boundary-condition-preserving complexes at both continuous and discrete levels. Additionally, the discrete symmetric H(divdiv) space is extended to ensure nestedness, which leads to optimality for the adaptive algorithm. Numerical examples confirm the effectiveness of the a posteriori error estimator and demonstrate the optimal convergence rate under adaptive refinements.