Poincar\'e series of some hypergraph algebras
Abstract
A hypergraph H=(V,E), where V=\x1,...,xn\ and E⊂eq 2V defines a hypergraph algebra RH=k[x1,...,xn]/(xi1... xik; \i1,...,ik\∈ E). All our hypergraphs are d-uniform, i.e., |ei|=d for all ei∈ E. We determine the Poincar\'e series PRH(t)=Σi=1∞k ToriRH(k,k)ti for some hypergraphs generalizing lines, cycles, and stars. We finish by calculating the graded Betti numbers and the Poincar\'e series of the graph algebra of the wheel graph.
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