A local form for the automorphisms of the spectral unit ball
classification
🧮 math.CV
math.FA
keywords
ballmatrixspectralunitautomorphismautomorphismsconjugationcyclic
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If F is an automorphism of the spectral unit ball, we show that, in a neighborhood of any cyclic (i.e. non-derogatory) matrix of the ball, the map F can be written as conjugation by a holomorphically varying non singular matrix. This provides a shorter proof of a theorem of J. Rostand, with a slightly stronger result.
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