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A Categorical Construction of Bachmann-Howard Fixed Points

Published 18 Sep 2018 in math.LO | (1809.06769v3)

Abstract: Peter Aczel has given a categorical construction for fixed points of normal functors, i.e. dilators which preserve initial segments. For a general dilator $X\mapsto T_X$ we cannot expect to obtain a well-founded fixed point, as the order type of $T_X$ may always exceed the order type of $X$. In the present paper we show how to construct a Bachmann-Howard fixed point of $T$, i.e. an order $\operatorname{BH}(T)$ with an "almost" order preserving collapse $\vartheta:T_{\operatorname{BH}(T)}\rightarrow\operatorname{BH}(T)$. Building on previous work, we show that $\Pi1_1$-comprehension is equivalent to the assertion that $\operatorname{BH}(T)$ is well-founded for any dilator $T$.

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