Lelong number mathematics , the Lelong number is an invariant of a point of a complex analytic variety that in some sense measures the local density at that point. It was introduced by. More generally a closed positive current u on a complex manifold has a Lelong number n for each point x of the manifold. Similarly a plurisubharmonic function also has a Lelong number at a point.Definitions The Lelong number of a plurisubharmonic function φ at a point x of C n x of an analytic subset A of pure dimension k , the Lelong number ν is the limit of the ratio of the areas of A ∩ B and a ball of radius r in C k zero . In other words the Lelong number is a sort of measure of the local density of A near x . If x is not in the subvariety A the Lelong number is 0 , and if x is a regular point the Lelong number is 1. It can be proved that the Lelong number ν is always an integer .
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