Growth of balls of holomorphic sections on projective toric varieties
Abstract
Let O(D) be an equivariant line bundle which is big and nef on a complex projective nonsingular toric variety X. Given a continuous toric metric \|·\| on O(D), we define the energy at equilibrium of (X,φD) where φD is the weight of the metrized toric divisor D=(D,\|·\|). We show that this energy describes the asymptotic behaviour as k→ ∞ of the volume of the L2-norm unit ball induced by (X,kφD) on the space of global holomorphic sections H0(X,O(kD)).
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