On extreme points of measures which implement an isometric embedding of model spaces
classification
🧮 math.CV
math.FA
keywords
thetaembeddingextremeinnerisometricmeasuresmodelpoints
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In 1996 A. Alexandrov solved an isometric embedding problem for model spaces $K_\Theta$ with an arbitrary inner function $\Theta$. We find all extreme points of this convex set of measures in the case when $\Theta$ is a finite Blaschke product, and obtain some partial results for generic inner functions.
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