On the Refinement of Certain Statistics on Alternating Words

Abstract

In this paper, we investigate statistics on alternating words under correspondence between ``possible reflection paths within several layers of glass'' and ``alternating words''. For v=(v1,v2,·s,vn)∈Zn, we say P is a path within n glass plates corresponding to v, if P has exactly vi reflections occurring at the ith plate for all i∈\1,2,·s,n\. We give a recursion for the number of paths corresponding to v satisfying v ∈ Zn and Σi≥ 1 vi=m. Also, we establish recursions for statistics around the number of paths corresponding to a given vector v∈Zn and a closed form for n=3. Finally, we give a equivalent condition for the existence of path corresponding to a given vector v.

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