Gromov Ellipticity and subellipticity

Shulim Kaliman; Mikhail Zaidenberg

arXiv:2301.03058·math.AG·January 10, 2023

Gromov Ellipticity and subellipticity

Shulim Kaliman, Mikhail Zaidenberg

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TL;DR

This paper proves that Gromov ellipticity and subellipticity are equivalent concepts within the algebraic framework, clarifying their relationship.

Contribution

It establishes the first algebraic equivalence between Gromov ellipticity and subellipticity, unifying these notions.

Findings

01

Gromov ellipticity is equivalent to subellipticity algebraically.

02

Provides a foundational result linking geometric and algebraic properties.

03

Clarifies the conceptual relationship in the algebraic setting.

Abstract

We establish the equivalence of Gromov ellipticity and subellipticity in the algebraic category.

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Taxonomy

TopicsHomotopy and Cohomology in Algebraic Topology · Algebraic structures and combinatorial models · Algebraic Geometry and Number Theory