Complete Geodesic Metrics in Big Classes
Abstract
Let (X,ω) be a compact K\"ahler manifold and θ be a smooth closed real (1,1)-form that represents a big cohomology class. In this paper, we show that for p≥ 1, the high energy space Ep(X,θ) can be endowed with a metric dp that makes (Ep(X,θ),dp) a complete geodesic metric space. The weak geodesics in Ep(X,θ) are the metric geodesic for (Ep(X,θ), dp). Moreover, for p > 1, the geodesic metric space (Ep(X,θ), dp) is uniformly convex.
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