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A bound on the $L^2$-norm of a projective structure by the length of the bending lamination

Published 21 Jan 2022 in math.GT and math.CV | (2201.08926v1)

Abstract: One can associate to a complex projective structure on a surface holomorphic quadratic differential $\Phi$ via the Schwarzian derivative and a bending lamination $\lambda$ via the Thurston parameterization. In this note we obtain upper bounds on the $L2$-norm of $\Phi$ in terms of the length of $\lambda$. The proof uses the theory of $W$-volume introduced by Krasnov-Schlenker.

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