Page:Cantortransfinite.djvu/135

on the former in such a way that ${\displaystyle e_{\nu }}$ and ${\displaystyle f_{\nu }}$ are corresponding elements. For ${\displaystyle e_{1}}$ the lowest element in rank of the first, must, in the process of imaging, be correlated to the lowest element ${\displaystyle f_{1}}$ of the second, the next after ${\displaystyle e_{1}}$ in rank ${\displaystyle (e_{2})}$ to ${\displaystyle f_{2}}$, the next after ${\displaystyle f_{1}}$, and so on. [500] Every other bi-univocal correspondence of the two equivalent aggregates ${\displaystyle \{e_{\nu }\}}$ and ${\displaystyle \{f_{\nu }\}}$ is not an "imaging" in the sense which we have fixed above for the theory of types.

On the other hand, let us take an ordered aggregate of the form

${\displaystyle \{e_{\nu }\}}$,

where ${\displaystyle \nu }$ represents all positive and negative finite integers, including ${\displaystyle 0}$, and where likewise

${\displaystyle e_{\nu }<e_{\nu +1}}$.

This aggregate has no lowest and no highest element in rank. Its type is, by the definition of a sum given in §8,

${\displaystyle ^{*}\!\omega +\omega }$.

It is similar to itself in an infinity of ways. For let us consider an aggregate of the same type

${\displaystyle \{f_{\nu '}\}}$,

where

${\displaystyle f_{\nu '}<f_{\nu '+1}}$.

Then the two ordered aggregates can be so imaged on one another that, if we understand by ${\displaystyle \nu _{0}'}$ a definite one of the numbers ${\displaystyle \nu '}$, to the element ${\displaystyle e_{\nu '}}$ of