Page:Cantortransfinite.djvu/142

determines its rank. We denote the ordinal type of ${\displaystyle R}$ by ${\displaystyle \eta }$:

(1)

${\displaystyle \eta ={\overline {R}}}$.

But we have put the same aggregate in another order of precedence in which we call it ${\displaystyle R_{0}}$. This order is determined, in the first place, by the magnitude of ${\displaystyle p+q}$, and in the second place—for rational numbers for which ${\displaystyle p+q}$ has the same value—by the magnitude of ${\displaystyle p/q}$ itself. The aggregate ${\displaystyle R_{0}}$ is a well-ordered aggregate of type ${\displaystyle \omega }$:

(2)

${\displaystyle R_{0}=(r_{1},r_{2},...,r_{\nu },...)}$, where ${\displaystyle r_{\nu }<r_{\nu +1}}$,

(3)

${\displaystyle {\overline {R_{0}}}=\omega }$.

Both ${\displaystyle R}$ and ${\displaystyle R_{0}}$ have the same cardinal number since they only differ in the order of precedence of their elements, and, since we obviously have ${\displaystyle {\overline {\overline {R_{0}}}}=\aleph _{0}}$, we also have

(4)

${\displaystyle {\overline {\overline {R}}}={\overline {\eta }}=\aleph _{0}}$.

Thus the type ${\displaystyle \eta }$ belongs to the class of types ${\displaystyle [\aleph _{0}]}$.

Secondly, we remark that in ${\displaystyle R}$ there is neither an element which is lowest in rank nor one which is highest in rank. Thirdly, ${\displaystyle R}$ has the property that between every two of its elements others lie. This property we express by the words: ${\displaystyle R}$ is "everywhere dense" (überalldicht).

We will now show that these three properties characterize the type ${\displaystyle \eta }$ of ${\displaystyle R}$, so that we have the following theorem: