Average area ratio and normalized total scalar curvature of hyperbolic n-manifolds
Abstract
On closed hyperbolic manifolds of dimension n≥ 3, we review the definition of the average area ratio of a metric h with Rh≥ -n(n-1) relative to the hyperbolic metric h0, and we prove that it attains the local minimum of one at h0, which solves a local version of Gromov's conjecture. Additionally, we discuss the relation between the average area ratio and normalized total scalar curvature for hyperbolic n-manifolds, as well as its relation to the minimal surface entropy if n is odd.
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