Construction of geodesics on Teichm\"uller spaces of Riemann surfaces with Z action
Abstract
Teichm\"uller space Teich(R) of a Riemann surface R is a deformation space of R. In this paper, we prove a sufficient condition for extremality of the Beltrami coefficients when R has the Z action. As an application, we discuss the construction of geodesics. Earle-Kra-Krushka\'l proved that the necessary and sufficient conditions for the geodesics connecting [0] and [μ] to be unique are \| μ0 \|∞ = | μ0 | ( z ) (a.e.z) and ``unique extremality''. As a byproduct of our results, we show that we cannot exclude ``unique extremality''.To show the above claim, we construct a point [μ0] in Teich( C Z), satisfying \| μ0 \|∞ = | μ0 | ( z ) (a.e.z) and there exists a family of geodesics \ γλ \ λ ∈ D connecting [0] and [μ0] with complex analytic parameter, where D is an open set in l∞.
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