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Main Author: Zheng, Dongzhe
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2506.00728
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author Zheng, Dongzhe
author_facet Zheng, Dongzhe
contents This paper develops a mirror symmetry theory of Spencer cohomology within the geometric framework of constrained systems on principal bundles, revealing deep symmetric structures in constraint geometry. Based on compatible pairs $(D,λ)$ under strong transversality conditions, we construct a systematic family of mirror transformations: from basic sign mirrors $λ\mapsto -λ$ to general automorphism-induced mirrors $λ\mapsto (dϕ)^*(λ)$. Our core result proves that these transformations preserve all geometric properties of compatible pairs and induce natural isomorphisms between Spencer cohomology groups. This theory unifies constraint mechanics, gauge field theory, and differential topology, establishing a complete mathematical framework for symmetry analysis of constraint systems and revealing the special mirror structure of Spencer complexes in constraint geometry.
format Preprint
id arxiv_https___arxiv_org_abs_2506_00728
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Geometric Duality Between Constraints and Gauge Fields: Mirror Symmetry and Spencer Isomorphisms of Compatible Pairs on Principal Bundles
Zheng, Dongzhe
General Mathematics
58A15, 53C29, 70G45, 81T13, 22E70
This paper develops a mirror symmetry theory of Spencer cohomology within the geometric framework of constrained systems on principal bundles, revealing deep symmetric structures in constraint geometry. Based on compatible pairs $(D,λ)$ under strong transversality conditions, we construct a systematic family of mirror transformations: from basic sign mirrors $λ\mapsto -λ$ to general automorphism-induced mirrors $λ\mapsto (dϕ)^*(λ)$. Our core result proves that these transformations preserve all geometric properties of compatible pairs and induce natural isomorphisms between Spencer cohomology groups. This theory unifies constraint mechanics, gauge field theory, and differential topology, establishing a complete mathematical framework for symmetry analysis of constraint systems and revealing the special mirror structure of Spencer complexes in constraint geometry.
title Geometric Duality Between Constraints and Gauge Fields: Mirror Symmetry and Spencer Isomorphisms of Compatible Pairs on Principal Bundles
topic General Mathematics
58A15, 53C29, 70G45, 81T13, 22E70
url https://arxiv.org/abs/2506.00728