On a metric view of the polynomial shift locus
Abstract
We relate generic points in the shift locus SD of degree D 2 polynomials to metric graphs. Using thermodynamic metrics on the space of metric graphs, we obtain a distance function D on SD. We study the (in)completeness of the metric space (SD, D). We prove that when D 3, the space (SD, D) is incomplete and its metric completion contains a subset homeomorphic to the space PSTD* introduced by DeMarco and Pilgrim. This provides a new way to understand the space PSTD*.
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