Random Groups at Density d<1/2: Sharp Length Inequalities for Generalized Torsion and a Fixed-width Exclusion via First-order Transfer

Abstract

Let G be a random group in Gromov's density model G(m,d,L) with d<12. We prove a sharp quantitative constraint on products of conjugates equal to the identity: for every n1 and >0, with overwhelming probability as L∞, any tight word \[ W=Πi=1n hi-1 g hi =1 G \] (with g≠ 1 as a word) satisfies the inequality \[ Σi=1n hi \;>\; 1-2d-2\,L \;-\; n2\,g. \] The proof is a short van Kampen diagram argument: Ollivier's sharp isoperimetric inequality forces a 2-cell contributing a large portion of its boundary to the outer boundary, and a simple boundary block-counting estimate yields this corridor-type lower bound. As consequences we obtain uniform short-witness exclusions and width--length tradeoffs for generalized torsion at every density d<12. We also deduce that random groups have no generalized torsion of any fixed width as a corollary of the recent first-order transfer theorem of Kharlampovich, Miasnikov, and Sklinos.