Subclasses of Presburger Arithmetic and the Weak EXP Hierarchy

Abstract

It is shown that for any fixed i>0, the i+1-fragment of Presburger arithmetic, i.e., its restriction to i+1 quantifier alternations beginning with an existential quantifier, is complete for EXPi, the i-th level of the weak EXP hierarchy, an analogue to the polynomial-time hierarchy residing between NEXP and EXPSPACE. This result completes the computational complexity landscape for Presburger arithmetic, a line of research which dates back to the seminal work by Fischer & Rabin in 1974. Moreover, we apply some of the techniques developed in the proof of the lower bound in order to establish bounds on sets of naturals definable in the 1-fragment of Presburger arithmetic: given a 1-formula (x), it is shown that the set of non-negative solutions is an ultimately periodic set whose period is at most doubly-exponential and that this bound is tight.