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DLT
2009
2009
Crucial Words for Abelian Powers
A word is crucial with respect to a given set of prohibited words (or simply prohibitions) if it avoids the prohibitions but it cannot be extended to the right by any letter of its alphabet without creating a prohibition. A minimal crucial word is a crucial word of the shortest length. A word W contains an abelian k-th power if W has a factor of the form X1X2 . . . Xk where Xi is a permutation of X1 for 2 i k. When k = 2 or 3, one deals with abelian squares and abelian cubes, respectively. Evdokimov and Kitaev [6] have shown that a minimal crucial word over an n-letter alphabet An = {1, 2, . . . , n} avoiding abelian squares has length 4n - 7 for n 3. In this paper, we show that a minimal crucial word over An avoiding abelian cubes has length 9n-13 for n 5, and it has length 2, 5, 11, and 20 for n = 1, 2, 3, and 4, respectively. Moreover, for n 4 and k 2, we give a construction of length k2 (n-1)-k -1 of a crucial word over An avoiding abelian k-th powers. This construction gives...
Real-time TrafficAbelian K-th Powers | Crucial Words | DLT 2009 | Minimal Crucial Word | Theoretical Computer Science |
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| Added | 17 Feb 2011 |
| Updated | 17 Feb 2011 |
| Type | Journal |
| Year | 2009 |
| Where | DLT |
| Authors | Amy Glen, Bjarni V. Halldórsson, Sergey Kitaev |
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