Michael's selection theorem in general d-minimal structures
Abstract
Thamrongthanyalak demonstrated a definable version of Michael's selection theorem in d-minimal expansions of the real field. We generalize this result to the case in which the structures are d-minimal expansions of ordered fields F=(F,<,+,·,0,1,…). We also show that we can choose a definable continuous selection f of a lower semi-continuous map T:E F so that f(x) is contained in the interior of T(x) when the interior is not empty.
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