On Tue, 26 Feb 2013 14:39:33 -0500, Shmuel Metz <firstname.lastname@example.org> wrote in <news:email@example.com> in rec.arts.sf.written,sci.math:
> In <firstname.lastname@example.org>, on 02/26/2013 > at 12:51 AM, Don Kuenz <email@example.com> 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.