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Set Theory

A set is a Many that allows itself to be thought of as a One.

Membership:
Open
Posting Access:
All Members , Moderated
This is a Livejournal community for talking about Set Theory and mathematics.

Please keep posts Set Theory-related. Other mathematically oriented posts are fine, but the tie-in with Set Theory should be clear.

This community is currently administered by amphiskios
akihiro kanamori, axiom of choice, axiom of determinacy, axiomatic systems, axioms, bertrand russel, boolean algebras, cardinals, class theory, compactness, continuum hypothesis, countable sets, denumerable, devlin, enumerable, equiconsistency, extensions, forcing, foundations of mathematics, frank ramsey, georg cantor, hugh woodin, inaccessible cardinals, kenneth kunen, large cardinal hypotheses, large cardinals, martin's axiom, math, measure theory, measureability, mikhail suslin, model theory, multiple forcing, numberable, ordinals, paul cohen, paul mahlo, proof theory, relative consistency, robert solovay, set theory, singular cardinal hypothesis, stationary sets, supercompactness, thomas jech, ultrafilters, ultrapowers, uncountable sets, well-founded relations, zorn's lemma

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