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http://hdl.handle.net/11144/471
Título: | An equivalent system for studying periodic points of the beta-transformation for a Pisot or a Salem number |
Autor: | Maia, Bruno |
Orientador: | Manning, Anthony K. |
Palavras-chave: | beta-transformation Pisot Salem case |
Data: | 2008 |
Editora: | University of Warwick |
Resumo: | We propose an equivalent system ( e C, L) for studying the set of eventually periodic points, P er(T β ), for the beta-transformation of the unit interval, when β is a Pisot or a Salem number. This system is defined by a map e C, which is closely related to the companion matrix C of the minimal polynomial of β (of degree d ≥ 2), and by a set of points L ⊂ Q d . The systems ( e C, L) and T β , [0, 1) ∩ Q(β) are semi-conjugate and furthermore the semi-conjugacy is one-to-one. Given that P er(T β ) ⊆ [0, 1) ∩ Q(β), we say that ( e C, L) is an equivalent system as far as the study of periodic points is concerned. We define symbolic dynamics for ( e C, L), which is related to the beta-expansions of numbers in the unit interval. We show that e C can be factored to the toral automorphism defined by C and we also study the geometry of ( e C, L). The main motivation for this work is Schmidt’s paper [Sch80], and in particular the theorem that P er(T β ) = [0, 1) ∩ Q(β) when β is a Pisot number, and the conjecture that the same should be true when β is a Salem number. We compare the different dynamical behaviours of ( e C, L) when β is Pisot and when β is Salem , and state some of the implications of Schmidt’s theorem and conjecture. Finally, we use computer simulations and plots for a particular Salem case of degree 4, with a view to gaining further insight about the general Salem case |
Revisão por Pares: | no |
URI: | http://hdl.handle.net/11144/471 |
Versão do editor: | http://homepages.warwick.ac.uk/~marcq/bmaia_thesis.pdf |
Aparece nas colecções: | BUAL - Teses de Doutoramento DCEE - Teses de Doutoramento |
Ficheiros deste registo:
Ficheiro | Descrição | Tamanho | Formato | |
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bmaia_thesis.pdf | 1,41 MB | Adobe PDF | Ver/Abrir |
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