Descriptive complexity of deterministic polylogarithmic time and space

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摘要

We propose logical characterizations of problems solvable in deterministic polylogarithmic time (PolylogTime) and polylogarithmic space (PolylogSpace). We introduce a novel two-sorted logic that separates the elements of the input domain from the bit positions needed to address these elements. We prove that the inflationary and partial fixed point variants of this logic capture PolylogTime and PolylogSpace, respectively. In the course of proving that our logic indeed captures PolylogTime on finite ordered structures, we introduce a variant of random-access Turing machines that can access the relations and functions of a structure directly. We investigate whether an explicit predicate for the ordering of the domain is needed in our PolylogTime logic. Finally, we present the open problem of finding an exact characterization of order-invariant queries in PolylogTime.

论文关键词:Descriptive complexity,Polylogarithmic queries

论文评审过程:Received 20 August 2019, Revised 10 February 2021, Accepted 18 February 2021, Available online 2 March 2021, Version of Record 5 March 2021.

论文官网地址:https://doi.org/10.1016/j.jcss.2021.02.003