Add to ORKG23 pages, 2 figuresIn this article, we prove that every unicritical polynomial map that has only rational multipliers is either a power map or a Chebyshev map. This provides some evidence in support of a conjecture by Milnor concerning rational maps whose multipliers are all integers
Abstract In this paper, we combine the KSS nest constructed by Kozlovski, Shen and van Strien, and t...
The celebrated Hilbert\u27s 10th problem asks for an algorithm to decide whether a system of po...
AbstractIt is shown that the rational functions of Higgins and Christov, orthogonal on [−∞, ∞], are ...
23 pages, 2 figuresIn this article, we prove that every unicritical polynomial map that has only rat...
17 pages, 4 figures, 6 tablesIn this article, we prove that every quadratic rational map whose multi...
17 pages, 4 figures, 6 tablesIn this article, we prove that every quadratic rational map whose multi...
In this thesis, we examine several arithmetic questions concerning the periodic points and multiplie...
In this thesis, we examine several arithmetic questions concerning the periodic points and multiplie...
In this thesis, we examine several arithmetic questions concerning the periodic points and multiplie...
In this thesis, we examine several arithmetic questions concerning the periodic points and multiplie...
Let $O_K$ be the ring of integers of an imaginary quadratic field. Recently, Zhuchao Ji and Junyi Xi...
Let $O_K$ be the ring of integers of an imaginary quadratic field. Recently, Zhuchao Ji and Junyi Xi...
Dans cette thèse, nous examinons plusieurs questions arithmétiques concernant les points périodiques...
AbstractA theorem of J. Silverman states that a forward orbit of a rational map φ(z) on P1(K) contai...
Let K be a number field, let f: P1 \u2192 P1 be a nonconstant rational map of degree greater than 1,...
Abstract In this paper, we combine the KSS nest constructed by Kozlovski, Shen and van Strien, and t...
The celebrated Hilbert\u27s 10th problem asks for an algorithm to decide whether a system of po...
AbstractIt is shown that the rational functions of Higgins and Christov, orthogonal on [−∞, ∞], are ...
23 pages, 2 figuresIn this article, we prove that every unicritical polynomial map that has only rat...
17 pages, 4 figures, 6 tablesIn this article, we prove that every quadratic rational map whose multi...
17 pages, 4 figures, 6 tablesIn this article, we prove that every quadratic rational map whose multi...
In this thesis, we examine several arithmetic questions concerning the periodic points and multiplie...
In this thesis, we examine several arithmetic questions concerning the periodic points and multiplie...
In this thesis, we examine several arithmetic questions concerning the periodic points and multiplie...
In this thesis, we examine several arithmetic questions concerning the periodic points and multiplie...
Let $O_K$ be the ring of integers of an imaginary quadratic field. Recently, Zhuchao Ji and Junyi Xi...
Let $O_K$ be the ring of integers of an imaginary quadratic field. Recently, Zhuchao Ji and Junyi Xi...
Dans cette thèse, nous examinons plusieurs questions arithmétiques concernant les points périodiques...
AbstractA theorem of J. Silverman states that a forward orbit of a rational map φ(z) on P1(K) contai...
Let K be a number field, let f: P1 \u2192 P1 be a nonconstant rational map of degree greater than 1,...
Abstract In this paper, we combine the KSS nest constructed by Kozlovski, Shen and van Strien, and t...
The celebrated Hilbert\u27s 10th problem asks for an algorithm to decide whether a system of po...
AbstractIt is shown that the rational functions of Higgins and Christov, orthogonal on [−∞, ∞], are ...