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The royal road to automatic noncommutative real analyticity, monotonicity, and convexity

J. E. Pascoe, Ryan Tully‐Doyle

2022Advances in Mathematics10 citationsDOIOpen Access PDF

Abstract

It was shown classically that matrix monotone and matrix convex functions must be real analytic by Löwner and Kraus respectively. Recently, various analogues have been found in several noncommuting variables. We develop a general framework for lifting automatic analyticity theorems in matrix analysis from one variable to several variables, the so-called “royal road theorem.” That is, we establish the principle that the hard part of proving any automatic analyticity theorem lies in proving the one variable theorem. We use our main result to prove the noncommutative Löwner and Kraus theorems over operator systems as examples, including an analogue of the rational “butterfly realization” of Helton-McCullough-Vinnikov for general analytic functions.

Topics & Concepts

MathematicsNoncommutative geometryConvexityMonotonic functionVariable (mathematics)Analytic functionOperator (biology)Realization (probability)Regular polygonPure mathematicsAlgebra over a fieldMatrix (chemical analysis)Monotone polygonDiscrete mathematicsMathematical analysisTranscription factorGeneComposite materialChemistryRepressorBiochemistryMaterials scienceEconomicsFinancial economicsGeometryStatisticsMathematical Inequalities and ApplicationsMatrix Theory and AlgorithmsHolomorphic and Operator Theory
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