Re: Incompleteness of Cantor's enumeration of the rational numbers (extra-ordinary)

On 09.01.2025 17:11, FromTheRafters wrote:

WM wrote on 1/9/2025 :

On 09.01.2025 13:27, FromTheRafters wrote:

WM wrote :

On 09.01.2025 01:07, joes wrote:

Am Wed, 08 Jan 2025 22:57:52 +0100 schrieb WM:

>

The rule is for n there is n+1. But the successor is not created
but does exist. How far do successors reach? Why do they not reach
to ω-1?
Where do they cease before?

They don't cease. They simply aren't in the same league, if you
will.

Cantor will. Every set of numbers of the first and second number
class has a smallest element. Hence they all are on the ordinal
line.

Zero is the smallest in the natural number class, omega is the
smallest of the infinite number class. Neither has a predecessor in
its class.

Are the natural numbers fixed or do they evolve?

Neither

There is no third alternative.

they are the smallest infinite set.

The set of prime numbers is infinite but smaller because it is a proper
subset. It has less than 1 % content.