Few maps in the rich structure for the domains GE(3;3;1,1,1) and GE(3;2;1,2)
Abstract
The primary goal of a rich structure for some naturally occurring domains X is to connect four naturally occurring objects of analysis in the context of 3× 3 analytic matrix functions on D. Combining this rich structure with the classical realisation formula and Hilbert space models in the sense of Agler, one can effectively construct functions in the space O( D, X) of analytic maps from D to X. This allows one to obtain solvability criteria for two cases of the μ-synthesis problem. We describe few maps in the rich structure. We define SE map between S1( C3, C3) and S3( C, C) and establish the relation between S1( C3, C3) and the set of analytic kernels on D3. We obtain the UW procedure and using the UW procedure we construct the Upper \,\,W and Upper\,\ E maps. We also construct Right~S and SE maps. We show how the interpolation problems for GE(3;3;1,1,1) and GE(3;2;1,2) can be reduced to a standard matricial Nevanlinna-Pick problem.
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