Flexible exponent of geometric 3-manifolds and Legendrian maps of Seifert spaces

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, oriented manifold M, the flexible exponent α(M) is the infimum of α≥ 0 such that |deg f|≤ C(Lip f)α holds for all differentiable map f:M M. The flexible exponent measures how effectively a manifold can wrap itself through self-maps. For geometric 3-manifolds M in the sense of Thurston, we give the complete result for α(M): \[ α(M)= cases 3 & M modeled on S3, E3, S2× E1,\\ 83 & M modeled on Nil,\\ 2 & M modeled on Sol,\\ 1 & M modeled on H2× E1,\\ 0 & M modeled on H3, SL2. cases \] To prove α(M)=8/3 for Nil 3-manifold M, we construct the so-called Legendrian map: a smooth self-map f: M M such that f is homotopic to the identity and f maps all S1-fibers into the orthogonal contact plane field simultaneously. Moreover, we prove that any Legendrian map must not be a diffeomorphism.