Intersections of Dual $SL_3$-Webs

Linhui Shen; Zhe Sun; Daping Weng

arXiv:2311.15466·math.GT·November 28, 2023·1 cites

Intersections of Dual $SL_3$-Webs

Linhui Shen, Zhe Sun, Daping Weng

PDF

Open Access

TL;DR

This paper introduces a topological intersection number for SL_3-webs on decorated surfaces, providing a combinatorial interpretation of a bijection related to higher Teichmüller spaces and proving flip equivariance crucial for duality conjectures.

Contribution

It defines a new intersection pairing for SL_3-webs and offers a combinatorial interpretation of a key bijection, advancing understanding of higher Teichmüller theory.

Findings

01

Introduced a topological intersection number for SL_3-webs.

02

Provided a combinatorial interpretation of the web bijection.

03

Proved flip equivariance of the bijection, supporting the Fock--Goncharov duality.

Abstract

We introduce a topological intersection number for an ordered pair of $SL_{3}$ -webs on a decorated surface. Using this intersection pairing between reduced $(SL_{3}, A)$ -webs and a collection of $(SL_{3}, X)$ -webs associated with the Fock--Goncharov cluster coordinates, we provide a natural combinatorial interpretation of the bijection from the set of reduced $(SL_{3}, A)$ -webs to the tropical set $A_{PGL_{3}, \hat{S}}^{+} (Z^{t})$ , as established by Douglas and Sun in \cite{DS20a, DS20b}. We provide a new proof of the flip equivariance of the above bijection, which is crucial for proving the Fock--Goncharov duality conjecture of higher Teichm\"uller spaces for $SL_{3}$ .

Peer Reviews

No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.

Videos

No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.

Taxonomy

TopicsAdvanced Combinatorial Mathematics · semigroups and automata theory · Geometric and Algebraic Topology