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Paper detail

Convexity analysis and matrix-valued Schur class over finitely connected planar domains

We identify the set of extreme points and apply Choquet theory to a normalized matrix-measure ball subject to finitely many linear side constraints. As an application we obtain integral representation formulas for the Herglotz class of matrix-valued functions on a finitely-connected planar domain and associated continuous Agler decompositions for the matrix-valued Schur class over the domain. The results give some additional insight into the negative answer to the spectral set problem over such domains recently obtained by Agler-Harland-Raphael and Dritschel-McCullough.

preprint2011arXivOpen access
Joseph A. BallMoisés Guerra Huamán
math.OAmath.FA
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Joseph A. BallMoisés Guerra Huamán

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