Log truncated threshold and zero mass conjecture

Abstract

For plurisubharmonic functions and lying in the Cegrell class of Bn and Bm respectively such that the Lelong number of at the origin vanishes, we show that the mass of the origin with respect to the measure (ddc\(z), (Az)\)n on Cn is zero for A∈ Hom(Cn,Cm)=Cnm outside a pluripolar set. For a plurisubharmonic function near the origin in Cn, we introduce a new concept coined the log truncated threshold of at 0 which reflects a singular property of via a log function near the origin (denoted by lt(,0)) and derive an optimal estimate of the residual Monge-Amp\`ere mass of at 0 in terms of its higher order Lelong numbers j() at 0 for 1≤ j≤ n-1, in the case that lt(,0)<∞. These results provide a new approach to the zero mass conjecture of Guedj and Rashkovskii, and unify and strengthen well-known results about this conjecture.