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APAL
2008
2008
The complexity of random ordered structures
We show that for random bit strings, Up(n), with probability, p = 1 2 , the firstorder quantifier depth D(Up(n)) needed to distinguish non-isomorphic structures is (lg lg n), with high probability. Further, we show that, with high probability, for random ordered graphs, G,p(n) with edge probabiltiy p = 1 2 , D(G,p(n)) = (log n), contrasting with the results of random (non-ordered) graphs, Gp(n), by Kim et al. [5] of D(Gp(n)) = log1/p n + O(lg lg n). Key words: random graphs, random bit strings, first order logic, Ehrenfeucht-Fraisse games
Real-time Traffic| Added | 08 Dec 2010 |
| Updated | 08 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | APAL |
| Authors | Joel H. Spencer, Katherine St. John |
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