Average Steps until Absorption on Random Walks on Sea Dragon Trees
Abstract
For a graph G and vertices u,v, we define the ASUA of v, t(G,v,u), to be the average steps until absorption along a random walk terminating at u. We define a sea dragon to be a tree with a unique path P such that if d(u) ≥ 3 for some vertex u, then u ∈ V(P). We use Markov chains to determine t(G,v,u) for all vertices of several classes of sea dragons, a broad subclass of trees. Additionally, we give several results on equations related to ASUAs on general graphs.
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