New linear invariants of hypergraphs
Abstract
We introduce a parameterized family of invariants for -uniform hypergraphs. To each K-linear transformation T:K Kr we associate a function Sig(-,T) that maps -uniform hypergraphs to K-vector spaces. Given an -uniform hypergraph H=(V,E), we use Sig(H,T) to define an equivalence relation T on V called T-fusion, which determines a quotient hypergraph F(H,T) called the T-frame of H. We show that the map U:K K, where U(λ)=λ(1)+·s+λ(), is universal in that Sig(H,T) embeds in Sig(H,U), and U-fusion refines T-fusion for any T:K^r. We further show that F(F(H,U),U)=F(H,U) for any -uniform hypergraph H, so F(-,U) is a closure function on the set of -uniform hypergraphs. We explore the properties of this one-time simplification of a hypergraph.
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