Logical Methods in Computer Science (Aug 2014)

Reductions to the set of random strings: The resource-bounded case

  • Eric Allender,
  • Harry Buhrman,
  • Luke Friedman,
  • Bruno Loff

DOI
https://doi.org/10.2168/LMCS-10(3:5)2014
Journal volume & issue
Vol. Volume 10, Issue 3

Abstract

Read online

This paper is motivated by a conjecture that BPP can be characterized in terms of polynomial-time nonadaptive reductions to the set of Kolmogorov-random strings. In this paper we show that an approach laid out in [Allender et al] to settle this conjecture cannot succeed without significant alteration, but that it does bear fruit if we consider time-bounded Kolmogorov complexity instead. We show that if a set A is reducible in polynomial time to the set of time-t-bounded Kolmogorov random strings (for all large enough time bounds t), then A is in P/poly, and that if in addition such a reduction exists for any universal Turing machine one uses in the definition of Kolmogorov complexity, then A is in PSPACE.

Keywords