Slicewise definability in first-order logic with bounded quantifier rank

Abstract

For every q∈ N let FOq denote the class of sentences of first-order logic FO of quantifier rank at most q. If a graph property can be defined in FOq, then it can be decided in time O(nq). Thus, minimizing q has favorable algorithmic consequences. Many graph properties amount to the existence of a certain set of vertices of size k. Usually this can only be expressed by a sentence of quantifier rank at least k. We use the color-coding method to demonstrate that some (hyper)graph problems can be defined in FOq where q is independent of k. This property of a graph problem is equivalent to the question of whether the corresponding parameterized problem is in the class para-AC0. It is crucial for our results that the FO-sentences have access to built-in addition and multiplication. It is known that then FO corresponds to the circuit complexity class uniform AC0. We explore the connection between the quantifier rank of FO-sentences and the depth of AC0-circuits, and prove that FOq ⊂neq FOq+1 for structures with built-in addition and multiplication.