Title: T-convexity, Weakly Immediate Types and $T$-$λ$-Spherical Completions of o-minimal Structures

Abstract: Let $T$ be the theory of an o-minimal field, and $T_{\mathrm{convex}}$ the theory of its expansion by a predicate $\mathcal{O}$ for a non-trival $T$-convex valuation ring. For $\lambda$ an uncountable cardinal, say that a unary type $p(x)$ over a model of $T_{\mathrm{convex}}$ is \emph{$\lambda$-bounded weakly immediate} if its cut is defined by an empty intersection of fewer than $\lambda$ many nested valuation balls. Call an elementary extension \emph{$\lambda$-bounded wim-constructible} if it is obtained as a transfinite composition of extensions each generated by one element whose type is $\lambda$-bounded weakly immediate.
I show that $\lambda$-bounded wim-constructible extensions do not extend the residue-field sort and that any two wim-constructible extensions can be amalgamated in an extension which is again $\lambda$-bounded wim-constructible over both.
A consequence is that given a cardinal $\lambda$, every model of $T_{\mathrm{convex}}$ has a unique-up-to-non-unique-isomorphism $\lambda$-spherically complete $\lambda$-bounded wim-constructible extension. We call this extension the $T$-$\lambda$-spherical completion.
In the case $T$ is power bounded, wim-constructible extensions are just the immediate extensions. I discuss the example of power bounded theories expanded by $\exp$.