Constructive proof

In axiomatic set theory, the gimel function is the following function mapping cardinal numbers to cardinal numbers:

${\displaystyle \gimel :\kappa \mapsto {\kappa }^{\mathrm{c}\mathrm{f}(\kappa )}}$

where cf denotes the cofinality function; the gimel function is used for studying the continuum function and the cardinal exponentiation function.

Values of the Gimel function

The gimel function has the property ${\displaystyle \gimel (\kappa )>\kappa }$ for all infinite cardinals κ by König's theorem.

For regular cardinals ${\displaystyle \kappa }$, ${\displaystyle \gimel (\kappa )=2^{\kappa }}$, and Easton's theorem says we don't know much about the values of this function. For singular ${\displaystyle \kappa }$, upper bounds for ${\displaystyle \gimel (\kappa )}$ can be found from Shelah's PCF theory.

Reducing the exponentiation function to the gimel function

All cardinal exponentiation is determined (recursively) by the gimel function as follows.

• If κ is an infinite successor cardinal then ${\displaystyle 2^{\kappa }=\gimel (\kappa )}$
• If κ is a limit and the continuum function is eventually constant below κ then ${\displaystyle 2^{\kappa }=2^{<\kappa }\times \gimel (\kappa )}$
• If κ is a limit and the continuum function is not eventually constant below κ then ${\displaystyle 2^{\kappa }=\gimel (2^{<\kappa })}$

The remaining rules hold whenever κ and λ are both infinite:

• If ℵ₀≤κ≤λ then κ^λ = 2^λ
• If μ^λ≥κ for some μ<κ then κ^λ = μ^λ
• If κ> λ and μ^λ<κ for all μ<κ and cf(κ)≤λ then κ^λ = κ^cf(κ)
• If κ> λ and μ^λ<κ for all μ<κ and cf(κ)>λ then κ^λ = κ

References

• Thomas Jech, Set Theory, 3rd millennium ed., 2003, Springer Monographs in Mathematics, Springer, ISBN 3-540-44085-2.