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arxiv: 1504.04664 · v7 · pith:VMN4R5SHnew · submitted 2015-04-18 · 🧮 math.LO

Computable copies of ell^p

classification 🧮 math.LO
keywords computablecategoricalcopiesspacebanachcomputablycomputehalting
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\begin{abstract} Suppose $p$ is a computable real so that $p \geq 1$. It is shown that the halting set can compute a surjective linear isometry between any two computable copies of $\ell^p$. It is also shown that this result is optimal in that when $p \neq 2$ there are two computable copies of $\ell^p$ with the property that any oracle that computes a linear isometry of one onto the other must also compute the halting set. Thus, $\ell^p$ is $\Delta_2^0$-categorical and is computably categorical if and only if $p = 2$. It is also shown that there is a computably categorical Banach space that is not a Hilbert space and that $\ell^p$ is linearly isometric to a computable Banach space if and only if $p$ is computable. These results hold in both the real and complex case.

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