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Main Author: Amorós, Jaume
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2401.07926
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author Amorós, Jaume
author_facet Amorós, Jaume
contents Examples of aspherical closed symplectic 4-manifolds are presented whose Sullivan minimal models are (1,n)-formal for any n, without being formal. They have as cohomology algebra, signature, canonical class, those of a product of a closed Riemann surface of genus g>1 and an elliptic curve, and the fundamental group, resp. $A_{\infty}$ category defined by their de Rham complex, is isomorphic to that of the product of surfaces up to brackets of order n+1, resp. products of order n+1. Nevertheless, the manifolds do not admit any holomorphic structure. These examples are derived from the fact that the Torelli groups are pro-unipotent. The mapping tori for representatives of suitable classes in the Torelli group are considered, and their product with $S^1$ is symplectized a la Thurston.
format Preprint
id arxiv_https___arxiv_org_abs_2401_07926
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Symplectized Torelli mapping tori
Amorós, Jaume
Symplectic Geometry
Geometric Topology
57K43, 57K20, 20F14
Examples of aspherical closed symplectic 4-manifolds are presented whose Sullivan minimal models are (1,n)-formal for any n, without being formal. They have as cohomology algebra, signature, canonical class, those of a product of a closed Riemann surface of genus g>1 and an elliptic curve, and the fundamental group, resp. $A_{\infty}$ category defined by their de Rham complex, is isomorphic to that of the product of surfaces up to brackets of order n+1, resp. products of order n+1. Nevertheless, the manifolds do not admit any holomorphic structure. These examples are derived from the fact that the Torelli groups are pro-unipotent. The mapping tori for representatives of suitable classes in the Torelli group are considered, and their product with $S^1$ is symplectized a la Thurston.
title Symplectized Torelli mapping tori
topic Symplectic Geometry
Geometric Topology
57K43, 57K20, 20F14
url https://arxiv.org/abs/2401.07926