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Template:About In computational complexity theory, the complexity class ${\displaystyle 𝖤𝖫𝖤𝖬𝖤𝖭𝖳𝖠𝖱𝖸}$ consists of the decision problems that can be solved in time bounded by an elementary recursive function. The most quickly-growing elementary functions are obtained by iterating an exponential function such as ${\displaystyle 2^n}$ for a bounded number ${\displaystyle k}$ of iterations, $${\displaystyle \begin{array}{c}{2}^{2^{2^{{\cdot }^{{\cdot }^{{\cdot }^n}}}}}\end{array}\}k.}$$

Thus, ${\displaystyle 𝖤𝖫𝖤𝖬𝖤𝖭𝖳𝖠𝖱𝖸}$ is the union of the classes

${\displaystyle \begin{array}{cc}𝖤𝖫𝖤𝖬𝖤𝖭𝖳𝖠𝖱𝖸& =\bigcup _{k\in \mathbb{N}}k\text{-}𝖤𝖷𝖯\\ & =𝖣𝖳𝖨𝖬𝖤\left(2^n\right)\cup 𝖣𝖳𝖨𝖬𝖤\left(2^{2^n}\right)\cup 𝖣𝖳𝖨𝖬𝖤\left(2^{2^{2^n}}\right)\cup \cdots .\end{array}}$

It is sometimes described as iterated exponential time,^[1] though this term more commonly refers to time bounded by the tetration function.^[2]

This complexity class can be characterized by a certain class of "iterated stack automata", pushdown automata that can store the entire state of a lower-order iterated stack automaton in each cell of their stack. These automata can compute every language in ${\displaystyle 𝖤𝖫𝖤𝖬𝖤𝖭𝖳𝖠𝖱𝖸}$, and cannot compute languages beyond this complexity class.^[3] The time hierarchy theorem implies that ${\displaystyle 𝖤𝖫𝖤𝖬𝖤𝖭𝖳𝖠𝖱𝖸}$ has no complete problems.

Every elementary recursive function can be computed in a time bound of this form, and therefore every decision problem whose calculation uses only elementary recursive functions belongs to the complexity class ${\displaystyle 𝖤𝖫𝖤𝖬𝖤𝖭𝖳𝖠𝖱𝖸}$.

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