Polya-Schur master theorems for circular domains and their boundaries

Abstract

We characterize all linear operators on finite or infinite-dimensional polynomial spaces that preserve the property of having the zero set inside a prescribed region ⊂eq C for arbitrary closed circular domains (i.e., images of the closed unit disk under a M\"obius transformation) and their boundaries. This provides a natural framework for dealing with several long-standing fundamental problems, which we solve in a unified way. In particular, for =R our results settle open questions that go back to Laguerre and P\'olya-Schur.

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