Develops topological pressure, variational principle, and strong positive recurrence to prove existence and uniqueness of equilibrium states for non-compact flows with specification.
On finite volume, negatively curved manifolds
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abstract
We study noncompact, complete, finite volume, negatively curved manifolds $M$. We construct $M$ with infinitely generated fundamental groups in all dimensions $n \geq 2$. We construct $M$ whose cusp cross sections are compact hyperbolic manifolds in all dimension $n\geq 3$. In contrast we show that if sectional curvature $-1<K(M)<0$, then cusp cross sections have zero simplicial volume. We construct negatively curved lattices that do not contain any parabolic isometries. We show that there are $M$ such that $\widetilde{M}$ does not satisfy the visibility axiom. We give a condition on the curvature growth versus the volume decay that guarantees topological finiteness. We raise a few questions on finite volume, negatively curved manifolds.
fields
math.DS 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Thermodynamic formalism for non-compact systems with expansivity and specification
Develops topological pressure, variational principle, and strong positive recurrence to prove existence and uniqueness of equilibrium states for non-compact flows with specification.