Maximal Haagerup subgroups in Zn+1_nGL2(Z)

Abstract

For n≥ 1, let n denote the standard action of GL2() on the space Pn()n+1 of homogeneous polynomials of degree n in two variables, with integer coefficients. For G a non-amenable subgroup of GL2(), we describe the maximal Haagerup subgroups of the semi-direct product n+1_n G, extending the classification of Jiang-Skalski JiSk of the maximal Haagerup subgroups in 2 SL2(). We prove that, for n odd, the group Pn() SL2() admits infinitely many pairwise non-conjugate maximal Haagerup subgroups which are free groups; and that, for n even, the group Pn() GL2() admits infinitely many pairwise non-conjugate maximal Haagerup subgroups which are isomorphic to SL2().