On the zero set of the Kobayashi--Royden pseudometric of the spectral unit ball
Abstract
Given A∈n, the n2-dimensional spectral unit ball, we show that B is a "generalized" tangent vector at A to an entire curve in n if and only if B is in the tangent cone CA to the isospectral variety at A. In the case of 3, the zero set of this metric is completely described.
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