Linear isometric invariants of bounded domains
Abstract
We introduce two new conditions for bounded domains, namely Ap-completeness and boundary blow down type, and show that, for two bounded domains D1 and D2 that are Ap-complete and not of boundary blow down type, if there exists a linear isometry from Ap(D1) to Ap(D2) for some real number p>0 with p≠ even integers, then D1 and D2 must be holomorphically equivalent, where for a domain D, Ap(D) denotes the space of Lp holomorphic functions on D.
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