Spectral dynamics for the infinite dihedral group and the lamplighter group

Abstract

For a tuple A=(A0,A1,·s,An) of elements in a Banach algebra B, its projective (joint) spectrum p(A) is the collection of z∈ Pn such that A(z)=z0A0+z1A1+·s+znAn is not invertible. If B is the group C*-algebra for a discrete group G generated by A0, A1,…, An with a representation , then p(A) is an invariant of (weak) equivalence for . In BY, B. Goldberg and R. Yang proved that the Julia set J(F) of the induced rational map F for the infinite dihedral group D∞ is the union of the projective spectrum with the extended indeterminacy set. But the extended indeterminacy set EF is complicated. To obtain a better relationship between the projective spectrum and the Julia set, by replacing Aπ(z)=z0+z1π(a)+z2π(t) with the extended pencil Aπ(z)=z0+z1π(a)+z2π(t)+z3π(at), where π is the Koopman representation, and using the method of operator recursions, we show that p(Aπ)=J(F). Further, we study the spectral dynamics for the Lamplighter group L, and prove that J(Q)=EQ, where Q is the rational map associated with L.