Quantization for Semipositive Adjoint Line Bundles
Abstract
Let L be a big and semipositive line bundle on a complex projective manifold X, and let θ∈ c1(L) be a smooth semipositive representative. In the adjoint setting H0(X,Lk KX), we prove that Donaldson's quantized Monge--Amp\`ere energy converges to the Monge--Amp\`ere energy for every bounded θ-plurisubharmonic function. This extends the quantization picture from the ample case to the big and semipositive setting, where smooth positive representatives are no longer available and non-pluripolar Monge--Amp\`ere theory is required. The main new input is a comparison theorem between adjoint Bergman kernels and their small ample twists. As a consequence, we prove that the normalized adjoint Bergman measures converge weakly to the corresponding non-pluripolar Monge--Amp\`ere measures. Our result partially answers a question of Berman--Freixas i Montplet concerning the convergence of quantized Monge--Amp\`ere energies in the semipositive setting.
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