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FOCS
1990
IEEE
1990
IEEE
Complexity of Unification in Free Groups and Free Semi-groups
The exponent of periodicity is an important factor in estimates of complexity of word-unification algorithms. We prove that the exponent of periodicity of a minimal solution of a word equation is at most 22.54n , where n is the length of the equation. Since the best known lower bound is 20.31n our upper bound is almost optimal and exponentially better than the original bound (6n)22n4 + 2. Thus our result implies exponential improvement of known upper bounds on complexity of word-unification algorithms. Moreover we give some evidence that, contrary to the common belief, the algorithm deciding satisfiability of equations in free groups, given by Makanin in not primitive recursive. The proofs are only sketched here. More details will be given in the full version.
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| Added | 11 Aug 2010 |
| Updated | 11 Aug 2010 |
| Type | Conference |
| Year | 1990 |
| Where | FOCS |
| Authors | Antoni Koscielski, Leszek Pacholski |
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