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Random groups of density d12 are finite. We prove the existence of a uniform quantifier elimination procedure for formulas of minimal rank (probably the superstable part of the theory). Namely, given a minimal rank formula V (p), we prove the existence of a formula (p) that belongs to the Boolean algebra of two quantifiers, so that the two formulas V (p) and (p) define the same set over the free group F₊ and over a random group of density d<12. We conclude that any given sentence of minimal rank is a truth sentence over the free group F₊ if and only if it is a truth sentence over random groups of density d<12.
Sobhi Massalha (Fri,) studied this question.
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