Characterization of invariant complex Finsler metrics and Schwarz lemma on the classical domains
Abstract
Our goal of this paper is to give a complete characterization of all holomorphic invariant strongly pseudoconvex complex Finsler metrics on the classical domains and establish a corresponding Schwarz lemma for holomorphic mappings with respect to these invariant metrics. We prove that every Aut(D)-invariant strongly pseudoconvex complex Finsler metric F on a classical domain D is a K\"ahler-Berwald metric which is not necessary Hermitian quadratic, but it enjoys very similar curvature property as that of the Bergman metric on D. In particular, if F is Hermitian quadratic, then F must be a constant multiple of the Bergman metric on D. This actually answers the 4-th open problem posed by Bland and Kalka (Variations of holomorphic curvature for K\"ahler Finsler metrics, American Mathematical Society, 1996).We also obtain a general Schwarz lemma for holomorphic mappings from a classical domain D1 into another classical domain D2 whenever D1 and D2 are endowed with arbitrary holomorphic invariant K\"ahler-Berwald metrics F1 and F2, respectively. The method used to prove the Schwarz lemma is purely geometric. Our results show that the Lu constant of (D,F) is both an analytic invariant and a geometric invariant. This can be better understood in the complex Finsler setting.
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