Quotient graphs and amalgam presentations for unitary groups over cyclotomic rings

Abstract

Suppose 4|n, n≥ 8, F=Fn=Q(ζn+ζn), and there is one prime p=pn above 2 in Fn. We study amalgam presentations for PU2(Z[ζn, 1/2]) and PSU2(Z[ζn, 1/2]) with the Clifford-cyclotomic group in quantum computing as a subgroup. These amalgams arise from an action of these groups on the Bruhat-Tits tree =p for SL2(Fp) constructed via the Hamilton quaternions. We explicitly compute the finite quotient graphs and the resulting amalgams for 8≤ n≤ 48, n≠ 44, as well as for PU2(Z[ζ60, 1/2]).