2S3 transformation for Dyadic fractions in the interval (0, 1)

The $2S3$ transformation, which was first described for positive integers, has been defined for dyadic rational numbers in the open interval $(0,1)$  in this study.  The set of dyadic rational numbers  is a Prüfer 2-group. For the dyadic $2S3$ transformation $T_{ds}(x)$, the restricted multiplicative and additive properties have been established. Graph parameters are used to generate more combinatorial outcomes for these properties. The relationship between the SM dyadic sum graph’s automorphism group and the symmetric group has been investigated.