A Lower Bound for the Diameter of Cayley Graph of the Symmetric Group Sn Generated by (12), (12 … n), (1n … 2)

Abstract

Let us denote elements of the symmetric group Sn using square brackets for the one-line notation. Cycles will be represented using parentheses, following the standard cycle notation. Under this convention, the full reversal of the identity element () is the element s = [n\ n-1 … 1]. In the present work, we obtain a lower bound on the decomposition complexity of elements s(1n … 2)i into the generators (12), (12 … n), (1n … 2), where i ranges over the set \1,2,…,n\. As a consequence, we derive the lower bound n(n-1)/2 for the diameter of Cayley graph of the group Sn generated by (12), (12 … n), (1n … 2).