Defect Spaces and Gram Operators for Tensor-Valued Incidence Maps
Abstract
We study vector-valued incidence maps obtained from ordinary graph incidence maps by linear observation of the free vertex space. Let be a field, a finite directed multigraph, an -vector space, and a vertex labeling with -linear extension . The vector-valued incidence map , , factors as , where is the classical incidence map of . We prove the formula where is the number of weakly connected components of and is the defect invariant. We apply this framework to directed tensor-labeled hypergraphs , in which each hyperedge carries a pair of boundary tensors in the tensor algebra , and prove that over any field for each of the six standard constructions, including symmetric encodings that degenerate in positive characteristic. Over , the edge Gram operator has rank , and its degree-truncated operators form a Loewner-monotone filtration whose rank increments equal the decrements of the defect filtration. We further realize the cycle space of every oriented hypergraph (in the sense of Reff--Rusnak) as within this framework, and exhibit a four-edge inclusion--exclusion example with .
Cite
@article{arxiv.2605.28535,
title = {Defect Spaces and Gram Operators for Tensor-Valued Incidence Maps},
author = {Kengo Miyamoto},
journal= {arXiv preprint arXiv:2605.28535},
year = {2026}
}
Comments
26 pages