The Hecke group H(λ4) acting on imaginary quadratic number fields

Abstract

Let H(λ4) be the Hecke group x,y\,:\, x2=y4=1 and, for a square-free positive integer n, consider the subset Q*(-n)=\(a+-n)/c \, | \, a,b=(a2+n)/c ∈ Z,\, c∈ 2Z \ of the quadratic imaginary number field Q(-n). Following a line of research in the relevant literature, we study properties of the action of H(λ4) on Q*(-n). In particular, we calculate the number of orbits arising from this action for every such n. Some illustrative examples are also given.