Multilinear Hyperquiver Representations
Abstract
We count singular vector tuples of a system of tensors assigned to the edges of a directed hypergraph. To do so, we study the generalisation of quivers to directed hypergraphs. Assigning vector spaces to the nodes of a hypergraph and multilinear maps to its hyperedges gives a hyperquiver representation. Hyperquiver representations generalise quiver representations (where all hyperedges are edges) and tensors (where there is only one multilinear map). The singular vectors of a hyperquiver representation are a compatible assignment of vectors to the nodes. We compute the dimension and degree of the variety of singular vectors of a sufficiently generic hyperquiver representation. Our formula specialises to known results that count the singular vectors and eigenvectors of a generic tensor. Lastly, we study a hypergraph generalisation of the inverse tensor eigenvalue problem and solve it algorithmically.
Keywords
Cite
@article{arxiv.2305.05622,
title = {Multilinear Hyperquiver Representations},
author = {Tommi Muller and Vidit Nanda and Anna Seigal},
journal= {arXiv preprint arXiv:2305.05622},
year = {2024}
}
Comments
December 4 2024: New Section 8 added