G-subsets and G-orbits of Q(sqrt n) under action of the modular group

Abstract

It is well known that G= x,y:x2=y3=1 represents the modular group PSL(2,Z), where x:z→-1z, y:z→z-1z are linear fractional transformations. Let n=k2m, where k is any non zero integer and m is square free positive integer. Then the set Q*(n):=\a+nc:a,c,b=a2-nc∈ Z~and~(a,b,c)=1\ is a G-subset of the real quadratic field Q(m) R9. We denote α=a+nc in Q*(n) by α(a,b,c). For a fixed integer s>1, we say that two elements α(a,b,c), α'(a',b',c') of Q*(n) are s-equivalent if and only if a a'(mod~s), b b'(mod~s) and c c'(mod~s). The class [a,b,c](mod~s) contains all s-equivalent elements of Q*(n) and Ens denotes the set consisting of all such classes of the form [a,b,c](mod~s). In this paper we investigate proper G-subsets and G-orbits of the set Q*(n) under the action of Modular Group G