Date: Feb 26, 2013 4:23 PM
Author: Brian M. Scott
Subject: Re: Problems with Infinity?

On Tue, 26 Feb 2013 14:39:33 -0500, Shmuel Metz
<spamtrap@library.lspace.org.invalid> wrote in
<news:512d0f75$10$fuzhry+tra$mr2ice@news.patriot.net> in
rec.arts.sf.written,sci.math:

> In <20130225b@crcomp.net>, on 02/26/2013
> at 12:51 AM, Don Kuenz <garbage@crcomp.net> said:


>> Answering my own question, Cantor's conjectures concern
>> set theory and only tangentially touch on the infinities
>> of complex variables. Using beginner's language, Cantor
>> uses two sets to define two levels of infinity. One set,
>> Aleph-0, holds countable infinity. The other set,
>> Aleph-1, holds continuum infinity, which includes
>> Aleph-0, along with every possible arrangement of
>> Aleph-0.


> No; Cantor's work on cardinality has nothing to do with
> Complex Analysis,


Though there are results in complex analysis that depend on
the continuum hypothesis, e.g.

<http://www.renyi.hu/~p_erdos/1964-04.pdf?utm_medium=referral&utm_source=t.co>.

(Followups set.)

Brian