- some
postwar editions.)
Dauben 1979 Dauben, J.: The
development of the
Cantorian set theory, pp.~181–219. See pp.216–217. In Bos, H.; Bunn, R.; Dauben...
- | = | P 1 ( A ) | {\displaystyle |A|=|P_{1}(A)|} is said to be
Cantorian: a
Cantorian set
satisfies the
usual form of Cantor's theorem. A set A {\displaystyle...
- In mathematics, the
cardinality of a set is the
number of its elements. The
cardinality of a set may also be
called its size, when no
confusion with other...
-
Mathematical Concepts with
Epsilon Pain, Or: A
Cantorial Approach to
Cantorian Arithmetic and
Other Mathematical Melodies" (PDF).
Indiana University...
-
cantorian set is
strongly cantorian. The
power set of a
strongly cantorian set is
strongly cantorian. The
cartesian product of two
strongly cantorian...
- of a
hyperreal field;
there is no
equivalence between them as with the
Cantorian transfinites. For example, if H is an
infinite number in this sense, then...
-
Cantorian Set
Theory and
Limitation of Size, Oxford:
Clarendon Press, ISBN 0-19-853179-6. Moore,
Gregory H. (June 1987). "Michael Hallett.
Cantorian set...
- In
constructive mathematics, a
collection X {\displaystyle X} is
subcountable if
there exists a
partial surjection from the
natural numbers onto it. This...
-
Starting in the 1870s, the term
gradually came to be ****ociated with
Cantorian set theory.
Mathematical rigour can be
modelled as
amenability to algorithmic...
- ('Fortunate and free!'). "Up
above the
young Rhine (Oben am
jungen Rhein)".
Cantorian.
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January 2015.
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