Axioms of adaptivity for separate marking

Abstract

Mixed finite element methods with flux errors in H(div)-norms and div-least-squares finite element methods require a separate marking strategy in obligatory adaptive mesh-refining. The refinement indicator σ2( T,K)=η2( T,K)+μ2(K) of a finite element domain K in an admissible triangulation T consists of some residual-based error estimator η( T,K) with some reduction property under local mesh-refining and some data approximation error μ(K). Separate marking means either Dörfler marking if μ2( T) ≤ κη2( T) or otherwise an optimal data approximation algorithm runs with controlled accuracy as established in [Carstensen, Rabus, Math.Comp. 2011; Rabus, J.Numer.Math. 2015]. The axioms are abstract and sufficient conditions on the estimators η( T,K) and data approximation errors μ(K) for optimal asymptotic convergence rates. The enfolded set of axioms simplifies CFP14 for collective marking, treats separate marking established for the first time in an abstract framework, generalizes [Carstensen, Park, SIAM J.Numer.Anal. 2015] for least-squares schemes, and extends [Carstensen, Rabus, Math.Comp. 2011] to the mixed FEM with flux error control in H(div).