Monday, August 28, 2023 11:30 am
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11:30 am
EDT (GMT -04:00)
Title: Sandpile groups of cones over trees
| Speaker: | Dorian Smith |
| Affiliation: | University of Minnesota Twin Cities |
| Location: | Please contact Sabrina Lato for Zoom link |
Abstract: The sandpile group K(G) of a graph G is a finite abelian group, isomorphic to the cokernel of the reduced graph Laplacian of G. We study K(G) when G = Cone(T) is obtained from a tree T on n vertices by attaching a new cone vertex attached to all other vertices. For two such families of graphs, we will describe K(G) exactly: the fan graphs Cone(P_n) where P_n is a path, and the thagomizer graph Cone(S_n) where S_n is the star-shaped tree. The motivation is that these two families turn out to be extreme cases among Cone(T) for all trees T on n vertices.