Maximal amenable MASAs of radial type in the free group factors

Abstract: We prove that if ${(M_j, \tau_j)}{j\in J}$ are tracial von Neumann algebras, $s_j \in M_j$ are selfadjoint semicircular elements and $t=(t_j)_j$ is a square summable $J$-tuple of real numbers with at least two non-zero entries, then the von Neumann algebra $A(t)$ generated by the ``weighted radial element'' $\sum_j t_j s_j\in M:=*{j\in J} M_j$ is maximal amenable in $M$, with $A(t)$, $A(t')$ unitary conjugate in $M$ iff $t, t'$ are proportional. Letting $M_j$ be diffuse amenable, $\forall j$, this provides a large family of maximal amenable MASAs in the free group factor $L\mathbb F_n$.