On Lelong numbers of plurisubharmonic functions on complex spaces

Abstract

In this paper, we introduce the notion of strong locally irreducible complex spaces X. Based on this notion we prove the equality (x)= mult(X,x). (x) for all x∈ X, where (x) is the projective mass of a plurisubharmonic function at x and mult(X,x) is the multiplicity of X at x and (x) is Lelong number of at x. Moreover, we show that the closure of the upper-level sets \z∈ X:(z)≥ c\ of a plurisubharmonic function on a strong locally irreducible complex space X is a subvariety of X for all c≥ 0.

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