On the descriptional complexity of operations on semilinear sets
Dateien zu dieser Ressource
Datum
2017Autor
Beier, Simon
Holzer, Markus
Kutrib, Martin
Zitierlink
http://dx.doi.org/10.22029/jlupub-6981Zusammenfassung
We investigate the descriptional complexity of operations on semilinear sets. Roughly speaking, a semilinear set is the finite union of linear sets, which are built by constant and period vectors. The interesting parameters of a semilinear set are: (i) the maximal value that appears in the vectors of periods and constants and (ii) the number of ... such sets of periods and constants necessary to describe the semilinear set under consideration. More precisely, we prove upper bounds on the union, intersection, complementation, and inverse homomorphism. In particular, our result on the complementation upper bound answers an open problem from [G. J. Lavado, G. Pighizzini, S. Seki: Operational State Complexity of Parikh Equivalence, 2014].