On the number of orbits arising from the action of PSL(2,Z) on imaginary quadratic number fields
Abstract
For square-free positive integers n, we study the action of the modular group PSL(2,Z) on the subsets \\,a+-nc∈ Q(-n)\, | \, a,b=a2+nc,c ∈ Z \,\ of the imaginary quadratic number fields Q(-n). In particular, we compute the number of orbits under this action for all such n as provide an interesting congruence property of this number. An illustrative example and a C++ code to calculate such a number for all 1≤ n ≤ 100 are also given.
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