English

A Structural Characterization of Determinantally Equivalent Functions

Combinatorics 2026-05-12 v2 Classical Analysis and ODEs

Abstract

Let Λ\Lambda be a set and F\mathbb{F} a field. Suppose that K,Q:Λ2FK,Q:\Lambda^2\to\mathbb{F} are two functions such that for any nNn\in\mathbb{N} and x1,x2,,xnΛx_1,x_2,\ldots,x_n\in\Lambda, the determinants of matrices (K(xi,xj))1i,jn(K(x_i,x_j))_{1\leq i,j\leq n} and (Q(xi,xj))1i,jn(Q(x_i,x_j))_{1\leq i,j\leq n} agree. We study to what extent KK and QQ must be related by two canonical transformations corresponding to diagonal similarity and transposition. In the symmetric case, this relation holds without further assumptions (see [Marco Stevens, Equivalent symmetric kernels of determinantal point processes, RMTA, 10(03):2150027, 2021]), while in general it fails. In [Harry Sapranidis Mantelos, Determinantally equivalent nonzero functions, Discrete Mathematics, 349(6):115021, 2026], it was shown that the relation remains valid under a natural 2×22\times 2 determinantal condition (property D\mathcal{D}), together with the additional assumption that both functions are nowhere vanishing. We prove that the 'nowhere vanishing' assumption can be removed entirely, and that property D\mathcal{D} alone provides the correct and complete structural mechanism governing the problem. In particular, this shows that the nowhere-zero assumption is not intrinsic to the problem, but rather an artefact of the specific method. The proof is entirely combinatorial and avoids linear algebra, relying on an analysis of permutations in the definition of a determinant as cycles in a graph; in particular, it requires new arguments to handle the breakdown of the identities used in \cite{mantelos2026determinantally}, which are crucial to the method therein. In the 'finite Λ\Lambda' case, this also yields a new approach to the classical matrix problem of [Raphael Loewy, Principal minors and diagonal similarity of matrices, Linear Algebra and its Applications 78 (1986), 23--64], thereby revealing an underlying combinatorial structure.

Keywords

Cite

@article{arxiv.2604.03934,
  title  = {A Structural Characterization of Determinantally Equivalent Functions},
  author = {Harry Sapranidis Mantelos},
  journal= {arXiv preprint arXiv:2604.03934},
  year   = {2026}
}

Comments

Revised exposition and restructuring of sections. 35 pages, 9 figures

R2 v1 2026-07-01T11:54:11.914Z