Vanishing of L2-Betti numbers and failure of acylindrical hyperbolicity of matrix groups over rings

Abstract

Let R be an infinite commutative ring with identity and n≥ 2 be an integer. We prove that for each integer i=0,1,·s ,n-2, the L2-Betti number bi(2)(G)=0, \ when G=GLn(R) the general linear group, SLn(R) the special linear group, % En(R) the group generated by elementary matrices. When R is an infinite principal ideal domain, similar results are obtained for Sp2n(R) the symplectic group, ESp2n(R) the elementary symplectic group, O(n,n)(R) the split orthogonal group or EO(n,n)(R) the elementary orthogonal group. Furthermore, we prove that G is not acylindrically hyperbolic if n≥ 4. We also prove similar results for a class of noncommutative rings. The proofs are based on a notion of n-rigid rings.