On Constructing Most General Solutions for Parametric Constraints (Extended Preprint)

Abstract

Let T be a theory allowing a form of elimination of existential quantifiers (possibly for formulae in a certain class). We analyze possibilities of constructing (most general) solutions w.r.t.\ T for formulae of the form ∃ x1 … ∃ xn ϕ(x1, …, xn, y1, …, ym), where ϕ is a quantifier-free conjunction of literals in the signature of T, and the free variables y1, …, ym are regarded as parameters. We show that in the presence of function symbols which describe `` if- then- else'' constructions in certain models of T, we can describe the most general solution of such formulae, thus generalizing results about the existence of most general unifiers in discriminator varieties. We illustrate the ideas on examples.

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