The Expressiveness of Looping Terms in the Semantic Programming

Abstract

We consider the language of 0-formulas with list terms interpreted over hereditarily finite list superstructures. We study the complexity of reasoning in extensions of the language of 0-formulas with non-standard list terms, which represent bounded list search, bounded iteration, and bounded recursion. We prove a number of results on the complexity of model checking and satisfiability for these formulas. In particular, we show that the set of 0-formulas with bounded recursive terms true in a given list superstructure HW(M) is non-elementary (it contains the class kEXPTIME, for all k≥slant 1). For 0-formulas with restrictions on the usage of iterative and recursive terms, we show lower complexity.