Descriptor: "11G50, 37F10" - Searchworks@Jio Institute Digital Library Search Results

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Author: Sookdeo, Vijay A.
Subjects: Mathematics - Number Theory, Mathematics - Dynamical Systems, 11G50, 37F10
Abstract: A theorem of J. Silverman states that a forward orbit of a rational map $\phi(z)$ on $\mathbb P^1(K)$ contains finitely many $S$-integers in the number field $K$ when $(\phi\circ\phi)(z)$ is not a polynomial. We state an analogous conjecture for the backward orbits using a general $S$-integrality notion based on the Galois conjugates of points. This conjecture is proven for the map $\phi(z)=z^d$, and consequently Chebyshev polynomials, by uniformly bounding the number of Galois orbits for $z^n-\beta$ when $\beta\not =0$ is a non-root of unity. In general, our conjecture is true provided that the number of Galois orbits for $\phi^n(z)-\beta$ is bounded independently of $n$., Comment: 13 pages
Published: 2008

Author: Vijay A. Sookdeo
Subjects: Dynamic Lehmerʼs Conjecture, Polynomial, Chebyshev polynomials, Conjecture, Algebra and Number Theory, Mathematics - Number Theory, Mathematics::Number Theory, 11G50, 37F10, Arithmetic dynamics, Dynamical Systems (math.DS), Algebraic number field, Galois orbits, Galois action on pre-images, Combinatorics, Backward orbits, Integer, Bounded function, Orbit (dynamics), FOS: Mathematics, Relative S-integrality, Number Theory (math.NT), Mathematics - Dynamical Systems, Mathematics
Abstract: A theorem of J. Silverman states that a forward orbit of a rational map $\phi(z)$ on $\mathbb P^1(K)$ contains finitely many $S$-integers in the number field $K$ when $(\phi\circ\phi)(z)$ is not a polynomial. We state an analogous conjecture for the backward orbits using a general $S$-integrality notion based on the Galois conjugates of points. This conjecture is proven for the map $\phi(z)=z^d$, and consequently Chebyshev polynomials, by uniformly bounding the number of Galois orbits for $z^n-\beta$ when $\beta\not =0$ is a non-root of unity. In general, our conjecture is true provided that the number of Galois orbits for $\phi^n(z)-\beta$ is bounded independently of $n$., Comment: 13 pages
Published: 2008
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