On state complexity of unions of binary factor-free languages
Abstract
It has been conjectured in 2011 by Brzozowski et al. that if K and L are factor-free regular languages over a binary alphabet having state complexity m and n, resp, then the state complexity of K L is at most mn-(m+n)+3-\m,n\. We disprove this conjecture by giving a lower bound of mn-(m+n)-2-\m,n\-22, which exceeds the conjectured bound whenever \m,n\≥ 10.
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