Non-deterministic approximation operators: ultimate operators, semi-equilibrium semantics and aggregates (full version)

Approximation fixpoint theory (AFT) is an abstract and general algebraic framework for studying the semantics of non-monotonic logics. In recent work, AFT was generalized to non-deterministic operators, i.e. operators whose range are sets of elements rather than single elements. In this paper, we make three further contributions to non-deterministic AFT: (1) we define and study ultimate approximations of nondeterministic operators, (2) we give an algebraic formulation of the semi-equilibrium semantics by Amendola, et al., and (3) we generalize the characterisations of disjunctive logic programs to disjunctive logic programs with aggregates. This is an extended version of our paper that will be presented at ICLP 2023 and will appear in the special issue of TPLP with the ICLP proceedings.