Integrable systems on hexagonal lattices and consistency on polytopes with quadrilateral and hexagonal faces

TL;DR

This paper introduces a new class of integrable systems called hex equations on hexagonal lattices, explores their multidimensional consistency on complex polytopes, and provides examples demonstrating their integrability and geometric structure.

Contribution

It defines hex equations as overdetermined systems on hexagons, extends multidimensional consistency to polytopes with hexagonal and quadrilateral faces, and constructs examples from face-centered quad equations.

Findings

Hex equations are well-defined and solvable on hexagonal lattices.

Multidimensional consistency is established on complex polytopes.

Explicit examples of consistent systems on various polytopes are provided.

Abstract

The new concept of a system of hex equations is introduced as an overdetermined system of six five-point face-centered quad equations defined on six vertices of a hexagon. For a consistent system of hex equations, two variables on neighbouring vertices of the hexagon can be solved for uniquely in terms of the other four. A consistent system of hex equations has a well-defined unique evolution in the hexagonal lattice under suitable initial value problems defined on a single connected staircase of points. Multidimensional consistency for systems of hex equations is proposed in terms of their consistency on certain polytopes which have both hexagonal and quadrilateral faces, and specific examples are presented for the hexagonal prism, the elongated dodecahedron, the truncated octahedron, and the 6-6-duoprism. Consistent systems of hex equations on such polytopes may be constructed from face-centered quad equations which satisfy consistency-around-a-face-centered-cube, in combination with regular quad equations that satisfy consistency-around-a-cube.