Nil-Equivariant Tropological Sigma Models on Filtered Geometries

TL;DR

This paper explores tropological sigma models on 4D target spaces, revealing their structure on filtered manifolds and introducing a new class of filtered Gromov Witten invariants.

Contribution

It classifies 4D tropological sigma models, uncovers their symmetry structures, and proposes a novel filtered Gromov Witten invariant framework.

Findings

Higher dimensional spaces admit nested Maslov dequantizations.

Sigma models are defined on filtered manifolds, not foliated geometries.

Enhanced symmetries characterized by 4D step 3 Engel algebra.

Abstract

We investigate the behavior of tropological (tropical topological) sigma models on higher dimensional target spaces and show that higher dimensional spaces explicitly admit nested Maslov dequantizations which lead to nontrivial anisotropic filtration structures. We provide a classification of all inequivalent tropological sigma models that can be constructed for the case of 4D targets and show that, generically, the corresponding sigma-models are not defined on foliated geometries like in the 2D case but instead are defined on filtered manifolds. We find that the nontrivial filtration structures lead to enhanced global symmetries characterized by noncompact nilpotent Lie algebras given by the 4 dimensional step 3 Engel algebra on the space of fields. We provide a Nilmanifold lattice regularization of the noncompact symmetry group and use this Nilmanifold symmetry to construct a natural equivariant extension of the tropological sigma model. We conjecture that these equivariant tropological sigma models are associated with a new version of GW invariants on filtered manifolds known as \textit{filtered Gromov Witten invariants