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Results tagged with ordinal-numbers
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user 17218
An ordinal is the order type of a well-ordered set. The first few ordinals are $0, 1, 2, \dots, \omega, \omega+1, \dots$ where $\omega$ is the order type of $\mathbb{N}$, and $\omega+1$ is the order type of $\mathbb{N}$ together with a maximum element.
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First-order definable bijection between $P(On)$ (or $No$) and $V$? (Is this equivalent to $V...
It is known that locally one can ``code'' any set in the von Neumann universe $V$ by a set of ordinals. But can one do this globally? In other words, is there a first-order definable bijection $P(On …
- 4,985
9
votes
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answer
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Transcendence degree of the surreals over the subfield generated by the ordinals
Consider the Grothendieck ring $K[\Omega]$ of the semiring $\Omega$ of all ordinals under the operations of natural sum and product. Its quotient field $K(\Omega)$ is naturally a subfield of the order …
- 4,985