On the Complexity and Decidability of Some Problems Involving Shuffle (1606.01199v2)

Abstract: The complexity and decidability of various decision problems involving the shuffle operation are studied. The following three problems are all shown to be $NP$-complete: given a nondeterministic finite automaton (NFA) $M$, and two words $u$ and $v$, is $L(M)$ not a subset of $u$ shuffled with $v$, is $u$ shuffled with $v$ not a subset of $L(M)$, and is $L(M)$ not equal to $u$ shuffled with $v$? It is also shown that there is a polynomial-time algorithm to determine, for $NFA$s $M_1, M_2$ and a deterministic pushdown automaton $M_3$, whether $L(M_1)$ shuffled with $L(M_2)$ is a subset of $L(M_3)$. The same is true when $M_1, M_2,M_3$ are one-way nondeterministic $l$-reversal-bounded $k$-counter machines, with $M_3$ being deterministic. Other decidability and complexity results are presented for testing whether given languages $L_1, L_2$ and $R$ from various languages families satisfy $L_1$ shuffled with $L_2$ is a subset of $R$, and $R$ is a subset of $L_1$ shuffled with $L_2$. Several closure results on shuffle are also shown.