On Dynamic Bit-Probe Complexity

Abstract

This paper presents several advances in the understanding of dynamic data structures in the bit-probe model:

• We improve the lower bound record for dynamic language membership problems to \(\Omega((\frac{{\rm lg}\ n}{\rm lg \ lg \ {\it n}})^{2})\). Surpassing \(\Omega({\rm lg} \ {\it n})\) was listed as the first open problem in a survey by Miltersen.

• We prove a bound of \(\Omega(\frac{{\rm lg}\ n}{\rm lg \ lg \ lg \ {\it n}})\) for maintaining partial sums in \({\mathbb Z}/2{\mathbb Z}\). Previously, the known bounds were \(\Omega(\frac{{\rm lg}\ n}{\rm lg \ lg \ {\it n}})\) and \(O({\rm lg}\ n)\).

• We prove a surprising and tight upper bound of \(O(\frac{{\rm lg} \ {\it n}}{\rm lg \ lg \ {\it n}})\) for predecessor problems. We use this to obtain the same upper bound for dynamic word and prefix problems in group-free monoids.