A note on a conjecture of Gromov about non-free isometric immersions
Roberto De Leo
TL;DR
This paper discusses extending recent results to support Gromov's conjecture on isometric immersions using non-free maps, contributing to the understanding of geometric embedding problems.
Contribution
It advances the proof of Gromov's conjecture by building on recent findings related to non-free isometric immersions.
Findings
Extended results towards Gromov's conjecture.
Progress in understanding non-free isometric immersions.
Potential implications for geometric embedding theory.
Abstract
Wextend the results obtained recently by G. D'Ambra and A. Loi towards the proof of a conjecture of M.Gromov on isometric immersions via non-free maps.
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Taxonomy
TopicsGeometric Analysis and Curvature Flows · Point processes and geometric inequalities · Geometry and complex manifolds