On the walk matrix of the Dynkin graph Dn
Abstract
Let W(Dn) denote the walk matrix of the Dynkin graph Dn, a tree obtained from the path of order n-1 by adding a pendant edge at the second vertex. We prove that rank\,W(Dn)=n-2 if 4 n and rank\,W(Dn)=n-1 otherwise. Furthermore, we prove that the Smith normal form of W(Dn) is diag[1,1,…,1n2,2,2,…,2n2-1,0] when 4 n. This confirms a recent conjecture in [W.Wang, F.Liu, W.Wang, Generalized spectral characterizations of almost controllable graphs, European J. Combin., 96(2021):103348].
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