Schwarz lemma on polydiscs endowed with holomorphic invariant K\"ahler-Berwald metrics

Abstract

In this paper, we obtain a Schwarz lemma for holomorphic mappings from the unit polydisc Pm into the unit polydisc Pn, here Pm and Pn are endowed with Aut(Pm)-invariant K\"ahelr-Berwald metric Ft,k and Aut(Pn)-invariant K\"ahler-Berwald metric Ft,k respectively. Our result generalizes the Schwarz lemma for holomorphic mappings from Pm into Pn whenever Pm and Pn are endowed with the Bergman metrics respectively. We also obtain a distortion theorem on the unit polydisc Pm, where Pm is endowd with an Aut(Pm)-invariant K\"ahler-Berwald metric Ft,k, and show that for each fixed t∈[0,+∞) and integer k≥ 2, Ft,k is actually a K\"ahler Finsler-Einstein metric in the sense of T. Aikou.