English

Trilinear Kernel Structure and Its Gravitational Realization

General Relativity and Quantum Cosmology 2026-01-19 v1

Abstract

We clarify the structural role of trilinear kernels in multidimensional integrable hierarchies and in stationary axisymmetric gravity. The Yu--Toda--Fukuyama (YTF) trilinear equation of Ref.~\cite{YuTodaSasaFukuyama:1998hierarchy} is shown to represent not a particular evolution equation but a universal kernel that generates the entire (3+1)(3+1)--dimensional hierarchy by selecting commuting flows. The frequently quoted trilinear equation of Ref.~\cite{YTSF1998} is identified as one such flow of this kernel. We further show that stationary axisymmetric gravity corresponds to a projective realization of the YTF kernel rather than to any single flow. Imposing \GL(2)\GL(2) covariance and homogeneity on the kernel leads uniquely to a gravitational trilinear kernel Y(τ0,τ1)\mathcal{Y}(\tau_0,\tau_1), whose vanishing reproduces the Ernst equation. The Tomimatsu--Sato family \cite{Tomimatsu1972} and related bilinear solutions are shown to arise as degenerate submanifolds of this projected trilinear structure, in agreement with the multilinear analysis of Ref.~\cite{Fukuyama:2025TS}. These results establish a unified structural framework linking multidimensional trilinear integrability, stationary gravity, and bilinear solution sectors, and clarify why trilinear kernels are both necessary and sufficient for describing soliton dynamics with projective geometry.

Cite

@article{arxiv.2601.10966,
  title  = {Trilinear Kernel Structure and Its Gravitational Realization},
  author = {Takeshi Fukuyama},
  journal= {arXiv preprint arXiv:2601.10966},
  year   = {2026}
}

Comments

8 pages, 1 figure

R2 v1 2026-07-01T09:06:59.894Z