Small Veblen ordinal: Difference between revisions
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Created page with "The Small Veblen ordinal is the limit of a finitary, variadic extension of the Veblen hierarchy. In particular, after the basic stage \( \varphi(\alpha, \beta) \), one lets \( \varphi(1,0,\alpha) \) enumerate fixed points of \( \beta \mapsto \varphi(\beta,0) \) - i.e. strongly critical ordinals - followed by \( \varphi(1,1,\alpha) \) enumerating its fixed points, and so on. The Small Veblen ordinal, very commonly abbreviated to SVO, is the least..."
RhubarbJayde (talk | contribs) (Created page with "The Small Veblen ordinal is the limit of a finitary, variadic extension of the Veblen hierarchy. In particular, after the basic stage \( \varphi(\alpha, \beta) \), one lets \( \varphi(1,0,\alpha) \) enumerate fixed points of \( \beta \mapsto \varphi(\beta,0) \) - i.e. strongly critical ordinals - followed by \( \varphi(1,1,\alpha) \) enumerating its fixed points, and so on. The Small Veblen ordinal, very commonly abbreviated to SVO, is the least...") |
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