Approximation of maximal plurisubharmonic functions
Abstract
Let u be a maximal plurisubharmonic function in a domain ⊂Cn (n≥ 2). It is classical that, for any U, there exists a sequence of bounded plurisubharmonic functions PSH(U) uj u satisfying the property: (ddc uj)n is weakly convergent to 0 as j→∞. In general, this property does not hold for arbitrary sequence. In this paper, we show that for any sequence of bounded plurisubharmonic functions PSH(U) uj u, (|uj|+1)-a (ddcuj)n is weakly convergent to 0 as j→∞, where a>n-1. We also generalize some well-known results about approximation of maximal plurisubharmonic functions.
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