Hrushovski construction model theory , a branch of mathematical logic , the Hrushovski construction generalizes the Fraïssé limit by working with a notion of strong substructure rather than. It can be thought of as a kind of "model-theoretic forcing", where a stable structure is created, called the generic or rich model. The specifics of determine various properties of the generic, with its geometric properties being of particular interest . It was initially used by Ehud Hrushovski to generate a stable structure with an "exotic" geometry, thereby refuting Zil'ber's Conjecture .Three conjectures The initial applications of the Hrushovski construction refuted two conjectures and answered a third question in the negative. Specifically, we have:L be a finite relational language. Fix C a class of finite L -structures which are closed under isomorphisms andwant to strengthen the notion of substructure; let be a relation on pairs from C satisfying: implies and implies for all implies for all If is an isomorphism and, then extends to an isomorphism for some superset of with Definition. An embedding is strong if Definition. The pair has the amalgamation property Definition. For infinite and we say iff for Definition. For any the closure of in denoted by is the smallest superset of satisfying Definition. A countable structure is -generic if: For For if then there is a strong embedding of into over has finite closures: for every is finite. Theorem. If has the amalgamation property, then there is a unique -generic.existence proof proceeds in imitation of the existence proof for Fraïssé limits. The uniqueness proof comes from an easy back and forth argument.
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