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Main Authors: González-Acuña, Francisco, Guzmán-Tristán, Araceli, Rodríguez-Viorato, Jesús, Migueles, José Andrés Rodríguez
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2511.14985
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author González-Acuña, Francisco
Guzmán-Tristán, Araceli
Rodríguez-Viorato, Jesús
Migueles, José Andrés Rodríguez
author_facet González-Acuña, Francisco
Guzmán-Tristán, Araceli
Rodríguez-Viorato, Jesús
Migueles, José Andrés Rodríguez
contents We study the existence of branched coverings between closed $3$-manifolds, with emphasis on universal knots and links. We prove that the only closed $3$-manifolds that admit a universal link are spherical. Furthermore, we distinguish between universal links and complement universal links and show that these notions do not coincide in general, by exhibiting infinitely many examples of complement universal links that are not universal. Also, we prove that there is no closed aspherical $3$-manifold, such that every closed, aspherical $3$-manifold is a branched covering over it. Finally, we characterize the closed $3$-manifolds admitting branching coverings from $P^3 \# P^3$, and deduce that there is no closed reducible $3$-manifold, such that every closed reducible $3$-manifold is a branched covering over it.
format Preprint
id arxiv_https___arxiv_org_abs_2511_14985
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On the existence of universal links in three-manifolds
González-Acuña, Francisco
Guzmán-Tristán, Araceli
Rodríguez-Viorato, Jesús
Migueles, José Andrés Rodríguez
Geometric Topology
57M12, 57M05, 57M50
We study the existence of branched coverings between closed $3$-manifolds, with emphasis on universal knots and links. We prove that the only closed $3$-manifolds that admit a universal link are spherical. Furthermore, we distinguish between universal links and complement universal links and show that these notions do not coincide in general, by exhibiting infinitely many examples of complement universal links that are not universal. Also, we prove that there is no closed aspherical $3$-manifold, such that every closed, aspherical $3$-manifold is a branched covering over it. Finally, we characterize the closed $3$-manifolds admitting branching coverings from $P^3 \# P^3$, and deduce that there is no closed reducible $3$-manifold, such that every closed reducible $3$-manifold is a branched covering over it.
title On the existence of universal links in three-manifolds
topic Geometric Topology
57M12, 57M05, 57M50
url https://arxiv.org/abs/2511.14985