Repository URL:
http://philsci-archive.pitt.edu/id/eprint/1291
Author(s):
Roy Lisker
preprint description
A natural extension of Cantor's hierarchic arithmetic of cardinals is proposed. These cardinals have the property that the application of the power set operator a finite number of times will generate the first countable cardinal, Aleph-0. Models for these based on the properties of Hilbert Space and on Combinatorics are suggested.

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