The volume of pseudoeffective line bundles and partial equilibrium
Abstract
Let (L,he-u) be a pseudoeffective line bundle on an n-dimensional compact K\"ahler manifold X. Let h0(X,Lk I(ku)) be the dimension of the space of sections s of Lk such that hk(s,s)e-ku is integrable. We show that the limit of k-nh0(X,Lk I(ku)) exists, and equals the non-pluripolar volume of P[u] I, the I-model potential associated to u. We give applications of this result to K\"ahler quantization: fixing a Bernstein-Markov measure , we show that the partial Bergman measures of u converge weakly to the non-pluripolar Monge--Amp\`ere measure of P[u] I, the partial equilibrium.
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