On Number of Turns in Reduced Random Lattice Paths

Abstract

We consider the tree-reduced path of symmetric random walk on d. It is interesting to ask about the number of turns Tn in the reduced path after n steps. This question arises from inverting signature for lattice paths. We show that, when n is large, the mean and variance of Tn have the same order as n, while the second order terms are O(1). We then use these estimates to obtain limit theorems for Tn. Similar results hold for any other finite patterns as well.