Scarcity of finite orbits for rational functions over a number field

Abstract: Let φ be a an endomorphism of degree d ≥ 2 of the projective line, defined over a number field K. Let S be a finite set of places of K, including the archimedean places, such that φ has good reduction outside of S. The article presents two main results: the first result is a bound on the number of K-rational preperiodic points of φ in terms of the cardinality of the set S and the degree d of the endomorphism φ. This bound is quadratic in terms of d which is a significant improvement to all previous bounds on t… Show more

“…Some authors characterize bad reduction as absence of potentially good reduction as in [1], while others (e.g. [5]) say that a map has bad 1.1]. Similar techniques have been applied to find bounds for the cardinality of finite orbits in terms of the number of bad primes, even for global function fields, as in [4].…”

“…Let F q denote the full constant field of K and S the set of primes of bad reduction: in this case O * S = F * q . Let L be the finite normal extension given by Lemma 4.4: L can be explicitly constructed, provided that one knows the ideal class group of O S (the reader is referred to the discussion before [5,Lemma 4.4] for details), but in general we do not even know its degree over K. The group O * S is by definition the radical of F * q in L * , i.e. O * S = F * , where F is the full constant field of L. The aim of this section is to prove Theorem 5.1, which can be regarded as a generalization of equation (2.1).…”

“…The next result is of a different nature: in this case we consider points with coordinates in a global field K. Let S be a finite set of primes of K; by putting together local information about p-adic distances for all primes outside S we establish a connection between points with certain properties and solutions of unit equations. The n-points lemmas are central tools in the work of Canci, Troncoso and Vishkautsan over number fields (see [5] and [6]) where they are applied in combination with bounds for the number of solutions of the resulting unit equations. The three points lemma we present here is a qualitative version of [5,Corollary 4.2]; its proof can be adapted from that of [5,Lemma 4.1] but we include it here for the reader's convenience.…”

“…The n-points lemmas are central tools in the work of Canci, Troncoso and Vishkautsan over number fields (see [5] and [6]) where they are applied in combination with bounds for the number of solutions of the resulting unit equations. The three points lemma we present here is a qualitative version of [5,Corollary 4.2]; its proof can be adapted from that of [5,Lemma 4.1] but we include it here for the reader's convenience. Lemma 6.3 (Three points lemma).…”

“…Canci, Troncoso e Vishkautsan in [5] give a bound for preperiodic points of rational functions over number fields that is quadratic in d and exponential in s. 1 This result depends on a reduction to unit equations with a number of solutions uniformly bounded by […”

Cycles for rational maps over global function fields with one prime of bad reduction

“…Some authors characterize bad reduction as absence of potentially good reduction as in [1], while others (e.g. [5]) say that a map has bad 1.1]. Similar techniques have been applied to find bounds for the cardinality of finite orbits in terms of the number of bad primes, even for global function fields, as in [4].…”

“…Let F q denote the full constant field of K and S the set of primes of bad reduction: in this case O * S = F * q . Let L be the finite normal extension given by Lemma 4.4: L can be explicitly constructed, provided that one knows the ideal class group of O S (the reader is referred to the discussion before [5,Lemma 4.4] for details), but in general we do not even know its degree over K. The group O * S is by definition the radical of F * q in L * , i.e. O * S = F * , where F is the full constant field of L. The aim of this section is to prove Theorem 5.1, which can be regarded as a generalization of equation (2.1).…”

“…The next result is of a different nature: in this case we consider points with coordinates in a global field K. Let S be a finite set of primes of K; by putting together local information about p-adic distances for all primes outside S we establish a connection between points with certain properties and solutions of unit equations. The n-points lemmas are central tools in the work of Canci, Troncoso and Vishkautsan over number fields (see [5] and [6]) where they are applied in combination with bounds for the number of solutions of the resulting unit equations. The three points lemma we present here is a qualitative version of [5,Corollary 4.2]; its proof can be adapted from that of [5,Lemma 4.1] but we include it here for the reader's convenience.…”

“…The n-points lemmas are central tools in the work of Canci, Troncoso and Vishkautsan over number fields (see [5] and [6]) where they are applied in combination with bounds for the number of solutions of the resulting unit equations. The three points lemma we present here is a qualitative version of [5,Corollary 4.2]; its proof can be adapted from that of [5,Lemma 4.1] but we include it here for the reader's convenience. Lemma 6.3 (Three points lemma).…”

“…Canci, Troncoso e Vishkautsan in [5] give a bound for preperiodic points of rational functions over number fields that is quadratic in d and exponential in s. 1 This result depends on a reduction to unit equations with a number of solutions uniformly bounded by […”

Cycles for rational maps over global function fields with one prime of bad reduction