Page:Cantortransfinite.djvu/120

with the cardinal number ${\displaystyle \nu +1}$. If the theorem is true for this aggregate, its truth for any other aggregate with the same cardinal number ${\displaystyle \nu +1}$ follows at once by § 1. Let ${\displaystyle E'}$ be any part of ${\displaystyle E_{\nu }}$; we distinguish the following cases:

(a) ${\displaystyle E'}$ does not contain ${\displaystyle e_{\nu }}$ as element, then ${\displaystyle E}$ is either ${\displaystyle E_{\nu -1}}$ [491] or a part of ${\displaystyle E_{\nu -1}}$, and so has as cardinal number either ${\displaystyle \nu }$ or one of the numbers ${\displaystyle 1,2,3,...,\nu -1}$, because we supposed our theorem true for the aggregate ${\displaystyle E_{\nu -1}}$, with the cardinal number ${\displaystyle \nu }$,

(b) ${\displaystyle E'}$ consists of the single element ${\displaystyle e_{\nu }}$, then ${\displaystyle {\overline {\overline {E'}}}=1}$.

(c) ${\displaystyle E'}$ consists of ${\displaystyle e_{\nu }}$ and an aggregate ${\displaystyle E''}$, so that ${\displaystyle E'=(E'',e_{\nu })}$. ${\displaystyle E''}$ is a part of ${\displaystyle E_{\nu -1}}$ and has therefore by supposition as cardinal number one of the numbers ${\displaystyle 1,2,3,...,\nu -1}$. But now ${\displaystyle {\overline {\overline {E'}}}={\overline {\overline {E''}}}+1}$, and thus the cardinal number of ${\displaystyle E'}$ is one of the numbers ${\displaystyle 2,3,...,\nu }$.

Proof of A.—Every one of the aggregates which we have denoted by ${\displaystyle E_{\nu }}$ has the property of not being equivalent to any of its parts. For if we suppose that this is so as far as a certain ${\displaystyle \nu }$, it follows from the theorem D that it is so for the immediately following number ${\displaystyle \nu +1}$. For ${\displaystyle \nu =1}$, we recognize at once that the aggregate ${\displaystyle E_{1}=(e_{0},e_{1})}$ is not equivalent to any of its parts, which are here ${\displaystyle (e_{0})}$ and ${\displaystyle (e_{1})}$. Consider, now, any two numbers ${\displaystyle \mu }$ and ${\displaystyle \nu }$ of the series ${\displaystyle 1,2,3,...}$; then, if ${\displaystyle \mu }$ is the earlier and ${\displaystyle \nu }$ the later, ${\displaystyle E_{\mu -1}}$ is a part of ${\displaystyle E_{\nu -1}}$. Thus ${\displaystyle E_{\mu -1}}$ and