Half-exponential function

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In mathematics, a half-exponential function is a function ƒ that, if composed with itself, results in an exponential:[1][2]

f(f(x)) = ab^x. \,

Another definition is that ƒ is half-exponential if it is non-decreasing and ƒ−1(xC) ≤ o(log x). for every C > 0.[3]

It has been proven that if a function ƒ is defined using the standard arithmetic operations, exponentials, logarithms, and real-valued constants, then ƒ(ƒ(x)) is either subexponential or superexponential.[4][5] Thus, a Hardy L-function cannot be half-exponential.

There are infinitely many functions whose self-composition is the same exponential function as each other. In particular, for every A in the open interval (0,1) and for every continuous strictly increasing function g from [0,A] onto [A,1], there is an extension of this function to a continuous monotonic function f on the real numbers such that f(f(x))=\exp x.[6] The function f is the unique solution to the functional equation

f (x) = \begin{cases} g (x) & \mbox{if } x \in [0,A], \\ \exp (g^{-1} (x)) & \mbox{if } x \in (A,1], \\ \exp (f ( \ln (x))) & \mbox{if } x \in (1,\infty), \\ \ln (f ( \exp (x))) & \mbox{if } x \in (-\infty,0). \\ \end{cases}

Half-exponential functions are used in computational complexity theory for growth rates "intermediate" between polynomial and exponential.[2]

See also

References

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External links

  1. http://mathoverflow.net/questions/12081/does-the-exponential-function-have-a-square-root
  2. http://mathoverflow.net/questions/45477/closed-form-functions-with-half-exponential-growth
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