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Publié en ligne: 08 juil. 2010
Pages: 249 - 256
DOI: https://doi.org/10.2478/v10037-009-0032-8
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An epsilon number is a transfinite number which is a fixed point of an exponential map: ωϵ = ϵ. The formalization of the concept is done with use of the tetration of ordinals (Knuth's arrow notation, ↑). Namely, the ordinal indexing of epsilon numbers is defined as follows:
and for limit ordinal λ:
Tetration stabilizes at ω:
Every ordinal number α can be uniquely written as
where κ is a natural number, n1, n2, …, nk are positive integers, and β1 > β2 > … > βκ are ordinal numbers (βκ = 0). This decomposition of α is called the Cantor Normal Form of α.