Landau-Ginzburg models of generalised Dubrovin-Zhang form and pole collision: Dynkin-type A

TL;DR

This paper generalizes Landau-Ginzburg mirror constructions for Dubrovin-Zhang Frobenius manifolds in type A, classifies their structures, and proves a conjecture on prepotentials using pole-collision techniques.

Contribution

It extends the method for constructing Landau-Ginzburg models, classifies Frobenius structures in type A, and proves a conjecture on prepotentials related to affine Weyl groups.

Findings

Classified Frobenius manifold structures in Dynkin type A.

Developed a pole-collision framework for comparing Frobenius structures.

Proved a conjecture of Ma and Zuo on prepotentials.

Abstract

In arXiv:1711.05958, arXiv:2103.12673, the authors derive one-dimensional Landau-Ginzburg mirrors of Dubrovin-Zhang Frobenius manifolds constructed on regular orbit spaces of an extension of affine Weyl groups. We generalise the method employed, and classify the resulting Frobenius manifold structures in Dynkin type A. We interpret our results in terms of a stratification on the Hurwitz space boundary, and develop a pole-collision framework to compare the Frobenius structures within different strata. With this, we can prove a structural result at the level of the prepotential, for arbitrary rank and dimension, as a suitable renormalised limit of the formulae in arXiv:2412.05165. As a corollary, a conjecture of Ma and Zuo regarding the form of prepotentials related to doubly-extended affine Weyl groups is proven.