Freely adding one layer of quantifiers to a Boolean doctrine
Abstract
We describe the layer of quantifier alternation depth at most one of the quantifier completion of a Boolean doctrine over a small category. This amounts to a doctrinal version of Herbrand's theorem for formulas with quantifier alternation depth at most one modulo a universal theory. The resulting construction satisfies a universal property that makes it the free QA-one-step Boolean doctrine. To achieve this version of Herbrand's theorem, we characterize, within the doctrinal setting, the classes A of quantifier-free formulas for which there is a model M such that A is precisely the class of formulas whose universal closure is valid in M.
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