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Some Extreme Rays of the Positive Pluriharmonic Functions

Published online by Cambridge University Press:  20 November 2018

Frank Forelli*
Affiliation:
The University of Wisconsin – Madison, Madison, Wisconsin
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1.1. We will denote by B the open unit ball in Cn, and we will denote by H(B) the class of all holomorphic functions on B. Let

Thus N(B) is convex (and compact in the compact open topology). We think that the structure of N(B) is of interest and importance. Thus we proved in [1] that if

(1.1)

if

(1.2)

and if n≧ 2, then g is an extreme point of N(B). We will denote by E(B) the class of all extreme points of N(B). If n = 1 and if (1.2) holds, then as is well known gE(B) if and only if

(1.3)

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1979

References

1. Forelli, F., Measures whose Poisson integrals are pluriharmonic II, Illinois J. Math. 19 (1975), 584592.Google Scholar
2. Forelli, F., A necessary condition on the extreme points of a class of holomorphic functions, Pacific J. Math. 73 (1977), 8186.Google Scholar