Mick gets some (the odds are on his side) (satisfiability)
- 1 January 1992
- conference paper
- Published by Institute of Electrical and Electronics Engineers (IEEE)
- p. 620-627
- https://doi.org/10.1109/sfcs.1992.267789
Abstract
Consider a randomly generated boolean formula F (in the conjunctive normal form) with m clauses of size k over n variables; k is fixed at any value greater than 1, but n tends to infinity and m = (1 + o(1))cn for some c depending only on k. It is easy to see that F is unsatisfiable with probability 1-o(1) whenever c>(ln 2)2/sup k/; the authors complement this observation by proving that F is satisfiable with probability 1-o(1) whenever c<(0.25)2/sup k//k; in fact, they present a linear-time algorithm that satisfies F with probability 1-o(1). In addition, they establish a threshold for 2-SAT: if k = 2 then F is satisfiable with probability 1-o(1) whenever c1.Keywords
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