High-dimensional expansion and soficity of groups
Abstract
For d ≥ 4 and p a sufficiently large prime, we construct a lattice ≤ PSp2d( Qp), such that its universal central extension cannot be sofic if satisfies some weak form of stability in permutations. In the proof, we make use of high-dimensional expansion phenomena and, extending results of Lubotzky, we construct new examples of cosystolic expanders over arbitrary finite abelian groups.
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