On slice measures of Green currents on CP(2)
Abstract
Let f be a holomorphic map of CP2 of degree d≥ 2, let T be its Green current and μ=T T be its equilibrium measure. We give a new proof of a theorem due to Dujardin asserting that μ TωP2 implies λ2=12 \ d, where λ1 ≥ λ2 are the Lyapunov exponents of μ. Then, assuming μ TωP2, we study slice measures :=T ddc|W|2, where W is a holomorphic local submersion. We give sufficient conditions on the Radon-Nikodym derivative of μ with respect to the trace measure TωP2 ensuring μ=. The involved submersion W comes from normal coordinates for the inverse branches of the iterates of f.
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