Fans and polytopes in tilting theory III: Classification of convex $g$-fans of rank 3

TL;DR

This paper classifies all convex $g$-fans of rank 3 in tilting theory, showing there are exactly 61 such fans up to isomorphism, using fan decomposition and mutation analysis.

Contribution

It provides a complete classification of convex $g$-fans of rank 3, identifying all possible fans and their structures in this dimension.

Findings

Exactly 61 convex $g$-fans of dimension 3 up to isomorphism.

Method involves fan decomposition into orthants and mutation sequence analysis.

Establishes finiteness and explicit classification in rank 3 case.

Abstract

The $g$-fan $\Sigma(A)$ of a finite dimensional algebra $A$ is a non-singular fan in its real Grothendieck group, defined by tilting theory. If the union ${\rm P}(A)$ of the simplices associated with the cones of $\Sigma(A)$ is convex, we call $A$ $g$-convex. In this case, the $g$-polytope ${\rm P}(A)$ of $A$ is a reflexive polytope. Thus, in each dimension, there are only finitely many isomorphism classes of fans that can be realized as $g$-fans of $g$-convex algebras. An important problem is to classify such fans for a fixed dimension $d$. In this paper, we give a complete answer for the case $d=3$: we prove that there are precisely 61 convex $g$-fans of dimension 3 up to isomorphism. Our method is based on the decomposition of fans into the $2^3$ orthants in the real Grothendieck group of $A$, together with a detailed analysis of possible sequences of $g$-vectors arising from iterated mutations.