Page:Cantortransfinite.djvu/107

sary and sufficient condition for the equality of their cardinal numbers.

[483] In fact, according to the above definition of power, the cardinal number ${\displaystyle {\overline {\overline {M}}}}$ remains unaltered if in the place of each of one or many or even all elements ${\displaystyle m}$ of ${\displaystyle M}$ other things are substituted. If, now, ${\displaystyle M\sim N}$, there is a law of co-ordination by means of which ${\displaystyle M}$ and ${\displaystyle N}$ are uniquely and reciprocally referred to one another; and by it to the element ${\displaystyle m}$ of ${\displaystyle M}$ corresponds the element ${\displaystyle n}$ of ${\displaystyle N}$. Then we can imagine, in the place of every element ${\displaystyle m}$ of ${\displaystyle M}$, the corresponding element ${\displaystyle n}$ of ${\displaystyle N}$ substituted, and, in this way, ${\displaystyle M}$ transforms into ${\displaystyle N}$ without alteration of cardinal number. Consequently

${\displaystyle {\overline {\overline {M}}}={\overline {\overline {N}}}}$.

The converse of the theorem results from the remark that between the elements of ${\displaystyle M}$ and the different units of its cardinal number ${\displaystyle {\overline {\overline {M}}}}$ a reciprocally univocal (or bi-univocal) relation of correspondence subsists. For, as we saw, ${\displaystyle {\overline {\overline {M}}}}$ grows, so to speak, out of ${\displaystyle M}$ in such a way that from every element ${\displaystyle m}$ of ${\displaystyle M}$ a special unit of ${\displaystyle M}$ arises. Thus we can say that

(9)	${\displaystyle M\sim {\overline {\overline {M}}}}$

In the same way ${\displaystyle N\sim {\overline {\overline {N}}}}$. If then ${\displaystyle {\overline {\overline {M}}}={\overline {\overline {N}}}}$, we have, by (6), ${\displaystyle M\sim N}$.

We will mention the following theorem, which results immediately from the conception of equival-