Lower Bound on Average-Case Complexity of Inversion of Goldreich’s Function by Drunken Backtracking Algorithms

We prove an exponential lower bound on the average time of inverting Goldreich’s function by drunken backtracking algorithms; this resolves the open question stated in Cook et al. (Proceedings of TCC, pp. 521–538, 2009 ). The Goldreich’s function has n binary inputs and n binary outputs. Every outpu...

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Bibliographic Details
Published in:Theory of computing systems Vol. 54; no. 2; pp. 261 - 276
Main Author: Itsykson, Dmitry
Format: Journal Article
Language:English
Published: Boston Springer US 01.02.2014
Springer Nature B.V
Subjects:
Algorithms
Analysis
Backtracking
Computer Science
Heuristic
Studies
Theory of Computation
Variables
Lower bound
Expander
DPLL
Goldreich’s function
ISSN:1432-4350, 1433-0490
Online Access:Get full text
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