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Fundamental sequences and fast-growing hierarchies for the Bachmann-Howard ordinal

We prove that Buchholz's system of fundamental sequences for the $\vartheta$ function enjoys various regularity conditions, including the Bachmann property. We partially extend these results to variants of the $\vartheta$ function, including a version without addition for countable ordinals. We conclude that the Hardy functions based on these notation systems enjoy natural monotonicity properties and majorize all functions defined by primitive recursion along $\vartheta(\varepsilon_{Ω+1})$.

preprint2024arXivOpen access
David Fernández-DuqueAndreas Weiermann
math.LO
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David Fernández-DuqueAndreas Weiermann

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