Rotational symmetries of domains and orthogonality relations

Soumya Ganguly; John N. Treuer

Rotational symmetries of domains and orthogonality relations

Soumya Ganguly, John N. Treuer

Abstract

Let $Ω\subset \mathbb{C}^n$ be a domain whose Bergman space contains all holomorphic monomials. We derive sufficient conditions for $Ω$ to be Reinhardt, complete Reinhardt, circular or Hartogs in terms of the orthogonality relations of the monomials with respect to their $L^2$-inner products and their $L^2$-norms. More generally, we give sufficient conditions for $Ω$ to be invariant under a linear group action of an $r$-dimensional torus, where $r \in \{1,\ldots, n\}$.

Rotational symmetries of domains and orthogonality relations

Abstract

Let

be a domain whose Bergman space contains all holomorphic monomials. We derive sufficient conditions for

to be Reinhardt, complete Reinhardt, circular or Hartogs in terms of the orthogonality relations of the monomials with respect to their

-inner products and their

-norms. More generally, we give sufficient conditions for

to be invariant under a linear group action of an

-dimensional torus, where

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