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Dynamical Systems and Related Topics Workshop
March 21-24, 1998
University of Maryland
College Park, MD, USA

Organizers
Mike Boyle, Brian Hunt, Jim Yorke

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Characterization of zeta functions of SFTs
by
Nicholas Ormes
Univ. of Texas, Austin
Coauthors: Mike Boyle, Ki Hang Kim, Fred Roush

Let S be a unital subring of the reals and let p(t) be a polynomial with coefficients in S and constant term 1. The Spectral Conjecture of Boyle and Handelman asserts that given certain necessary conditions (Perron and tracial), there is a primitive matrix over S with characteristic polynomial of the form t^k[p(1/t)]. We prove the conjecture for S=Z. This result characterizes the zeta functions of mixing shifts of finite type (SFTs), and easily yields a characterization of the zeta functions of arbitrary SFTs.

Date received: March 18, 1998

Copyright © 1998 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cabf-28.