Reducts of Hrushovski's constructions of a higher geometrical arity
Abstract
Let Mn denote the structure obtained from Hrushovski's (non collapsed) construction with an n-ary relation and PG(Mn) its associated pre-geometry. It was shown by Evans and Ferreira that PG(M3) PG(M4). We show that M3 has a reduct, Mclq such that PG(M4) PG(Mclq). To achieve this we show that Mclq is a slightly generalised Fra\"iss\'e-Hrushovski limit incorporating into the construction non-eliminable imaginary sorts in Mclq.
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