Flexible exponents of non-geometric 3-manifolds
Abstract
A classical question in quantitative topology is to bound the mapping degree deg(f) in terms of its Lipchitz constant Lip(f). For a closed, orientable, Riemannian manifold M, the flexible exponent α(M) is the infimum of α≥slant 0 such that |deg(f)|≤slant C· (Lip(f))α holds for any Lipschitz map f:M M. For a geometric 3-manifold M in the sense of Thurston, α(M) is determined in DLWWW. In this paper, we determine α(M) for non-geometric 3-manifolds.
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