A Schwarz lemma for the symmetrized polydisc via estimates on another family of domains

Abstract

We make some sharp estimates to obtain a Schwarz lemma for the symmetrized polydisc Gn, a family of domains naturally associated with the spectral interpolation, defined by \[ Gn :=\ (Σ1≤ i≤ n zi,Σ1≤ i<j≤ nzizj …, Πi=1n zi ): \,|zi|<1, i=1,…,n \. \] We first make a few estimates for the the extended symmetrized polydisc Gn, a family of domains introduced in pal-roy 4 and defined in the following way: align* Gn := \ (y1,…,yn-1, q)∈ n :\; q ∈ D, \; yj = j + n-j q, \; βj ∈ C & and \\ |βj|+ |βn-j| < n j & for j=1,…, n-1 \. align* We then show that these estimates are sharp and provide a Schwarz lemma for . It is easy to verify that Gn= Gn for n=1,2 and that Gn ⊂neq Gn for n≥ 3. As a consequence of the estimates for Gn, we have analogous estimates for Gn. Since for a point (s1,…, sn-1,p)∈ Gn, n i is the least upper bound for |si|, which is same for |yi| for any (y1,… ,yn-1,q) ∈ Gn, 1≤ i ≤ n-1, the estimates become sharp for Gn too. We show that these conditions are necessary and sufficient for Gn when n=1,2, 3. In particular for n=2, our results add a few new necessary and sufficient conditions to the existing Schwarz lemma for the symmetrized bidisc.

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