Nonelementary problem
In computational complexity theory, a nonelementary problem is a problem that is not a member of the class ELEMENTARY. As a class it is sometimes denoted as NONELEMENTARY.
Examples of nonelementary problems that are nevertheless decidable include:
- the problem of regular expression equivalence with complementation
- the decision problem for monadic second-order logic over trees (see S2S)
- the decision problem for term algebras
- satisfiability of W. V. O. Quine's fluted fragment of first-order logic
- deciding β-convertibility of two closed terms in typed lambda calculus
- reachability in vector addition systems; it is Ackermann-complete.
- reachability in Petri nets; it is Ackermann-complete.
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