Anthony Genevois, Arnaud Stocker
Published 2017-12-13Version 1
In this paper, we show that, if a group $G$ acts geometrically on a geodesically complete CAT(0) space $X$ which contains at least one point with a CAT(-1) neighborhood, then $G$ must be either virtually cyclic or acylindrically hyperbolic. As a consequence, the fundamental group of a compact Riemannian manifold whose sectional curvature is nonpositive everywhere and negative in at least one point is either virtually cyclic or acylindrically hyperbolic. This statement provides a precise interpretation of an idea expressed by Gromov in his paper Asymptotic invariants of infinite groups.
Comments: 15 pages, 3 figures. Comments are welcome
Negative curvature in automorphism groups of one-ended hyperbolic groups
Acylindrical hyperbolicity of automorphism groups of infinitely-ended groups
Infinitely presented graphical small cancellation groups are acylindrically hyperbolic
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