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STACS
1991
Springer
1991
Springer
On Aperiodic Trace Languages
Formal power series over non-commuting variables have been investigated as representations of the behavior of automata with multiplicities. Here we introduce and investigate the concepts of aperiodic and of star-free formal power series over semirings and partially commuting variables. We prove that if the semiring K is idempotent and commutative, or if K is idempotent and the variables are non-commuting, then the product of any two aperiodic series is again aperiodic. We also show that if K is idempotent and the matrix monoids over K have a Burnside property (satisfied, e.g. by the tropical semiring), then the aperiodic and the star-free series coincide. This generalizes a classical result of Sch¨utzenberger (1961) for aperiodic regular languages and contains a result of Guaiana, Restivo and Salemi (1992) on aperiodic trace languages.
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| Added | 27 Aug 2010 |
| Updated | 27 Aug 2010 |
| Type | Conference |
| Year | 1991 |
| Where | STACS |
| Authors | Giovanna Guaiana, Antonio Restivo, Sergio Salemi |
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