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Effective bounds for the zeros of linear recurrences in function fields

Clemens Fuchs, Attila Pethő (2005)

Journal de Théorie des Nombres de Bordeaux

In this paper, we use the generalisation of Mason’s inequality due to Brownawell and Masser (cf. [8]) to prove effective upper bounds for the zeros of a linear recurring sequence defined over a field of functions in one variable.Moreover, we study similar problems in this context as the equation $G_{n} (x) = G_{m} (P (x)), (m, n) \in ℕ^{2}$ , where $(G_{n} (x))$ is a linear recurring sequence of polynomials and $P (x)$ is a fixed polynomial. This problem was studied earlier in [14,15,16,17,32].

Effective diophantine approximation on $𝔾_{m}$

Enrico Bombieri (1993)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

Effective estimates of solutions of some diophantine equations

H. Stark (1973)

Acta Arithmetica

Effective finiteness results for binary forms with given discriminant

J. H. Evertse, K. Gyory (1991)

Compositio Mathematica

Effective finiteness theorems for decomposable forms of given discriminant

J. H. Evertse, K. Győry (1992)

Acta Arithmetica

Effective results for Diophantine equations over finitely generated domains

Attila Bérczes, Jan-Hendrik Evertse, Kálmán Győry (2014)

Acta Arithmetica

Let A be an arbitrary integral domain of characteristic 0 that is finitely generated over ℤ. We consider Thue equations F(x,y) = δ in x,y ∈ A, where F is a binary form with coefficients from A, and δ is a non-zero element from A, and hyper- and superelliptic equations $f (x) = δ y^{m}$ in x,y ∈ A, where f ∈ A[X], δ ∈ A∖0 and $m \in ℤ_{\geq 2}$ . Under the necessary finiteness conditions we give effective upper bounds for the sizes of the solutions of the equations in terms of appropriate representations for A, δ, F, f, m. These...