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Dynamical Determinants via Dynamical Conjugacies for Postcritically Finite Polynomials

Authors:	Viviane Baladi Yunping Jiang Hans Henrik Rugh

Institution:	(1) CNRS, Université Paris-Sud, UMR 8628, F-91405 Orsay, France;(2) Department of Mathematics, Queens College CUNY, Flushing, New York, 11367;(3) Département des Mathématiques, Université de Cergy-Pontoise, F-95302 Cergy-Pontoise, France;(4) Present address: IHES, F-91440 Bures-sur-Yvette, France;(5) Department of Mathematics, CUNY Graduate School, New York, New York, 10016

Abstract:	We give an analogue of Levin–Sodin–Yuditskii's study of the dynamical Ruelle determinants of hyperbolic rational maps in the case of subhyperbolic quadratic polynomials. Our main tool is to reduce to an expanding situation. We do so by applying a dynamical change of coordinates on the domains of a Markov partition constructed from the landing ray at the postcritical repelling orbit. We express the dynamical determinants $d_\beta (z) = \exp - \sum {_{k \geqslant 1} } \tfrac{{z^k }}{k}\sum {_{w \in {\text{Fix }}f^k } \tfrac{1}{{((f_c^k )'(w))^\beta }}\tfrac{1}{{1 - \tfrac{1}{{(f_c^k )'(w)}}}}(\beta \in \mathbb{Z}_ + )}$ as the product of an (entire) determinant with an explicit expression involving the postcritical repelling orbit, thus explaining the poles in d (z).

Keywords:	Subhyperbolic/periodic/(post)critically finite quadratic polynomial dynamical Fredholm determinant Ruelle transfer operator Yoccoz puzzle
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