Projective Logarithmic Potentials

Abstract

We study the projective logarithmic potential Gμ of a Probability measure μ on the complex projective space Pn equiped with the Fubini-Study metric ω. We prove that the Green operator G has strong regularizing properties. It was shown by the second author that the range of the operator G is contained in the (local) domain of definition of the complex Monge-Amp\`ere operator on Pn. This result extends earlier results by Carlehed. We will show that the complex Monge-Amp\`ere measure of the logarithmic potential of μ is absolutely continuous with respect to the Lebesgue measure on Pn if and only if the measure μ has no atoms. Moreover when the measure μ has a "positive dimension", we give more precise results on regularity properties of the potential Gμ in terms of the dimension of μ.