AbstractIn the paper [J. Ritt, Prime and composite polynomials, Trans. Amer. Math. Soc. 23 (1922) 51–66] Ritt constructed the theory of functional decompositions of polynomials with complex coefficients. In particular, he described explicitly polynomial solutions of the functional equation f(p(z))=g(q(z)). In this paper we study the equation above in the case where f,g,p,q are holomorphic functions on compact Riemann surfaces. We also construct a self-contained theory of functional decompositions of rational functions with at most two poles generalizing the Ritt theory. In particular, we give new proofs of the theorems of Ritt and of the theorem of Bilu and Tichy
AbstractIn this paper we give a new proof of a classical result by Fréchet [M. Fréchet, Une définiti...
AbstractIn 1922, Ritt [13] proved two remarkable theorems on decompositions of polynomial maps of C[...
In [R1]-[R4] J.F.Ritt proved some theorems concerning composition of (complex) rational functions. T...
Ritt has shown that any complex polynomial p can be written as the composition of polynomials p1, . ...
AbstractThe classical Ritt's theorems state several properties of univariate polynomial decompositio...
AbstractIt is known (Ritt, 1923; Engstrom, 1941; Lévi, 1942; Dorey and Whaples, 1972) that over fiel...
Abstract. Let f(x) be a complex rational function. In this work, we study conditions under which f(x...
In this note, for any given real numbers a, b, c, we determine all the solutions f: R − → R of the f...
If g and h are functions over some field, we can consider their composition f = g(h). The inverse pr...
In this thesis, our main theorem gives the classification of all Laurent polynomials $f(X)$ such tha...
In this paper, we prove that infinite-dimensional vector spaces of α-dense curves are generated by m...
In this thesis, we shall prove some results which, in turn, will allow us to solve some factorizatio...
Let $P(z)$ and $Q(y)$ be polynomials of the same degree $k \geq 1$ in the complex variables $z$ and ...
AbstractBy introducing the concept of near-separated polynomial we extend to rational functions a th...
The factorization theory of meromorphic functions of one complex variable is to study how a given me...
AbstractIn this paper we give a new proof of a classical result by Fréchet [M. Fréchet, Une définiti...
AbstractIn 1922, Ritt [13] proved two remarkable theorems on decompositions of polynomial maps of C[...
In [R1]-[R4] J.F.Ritt proved some theorems concerning composition of (complex) rational functions. T...
Ritt has shown that any complex polynomial p can be written as the composition of polynomials p1, . ...
AbstractThe classical Ritt's theorems state several properties of univariate polynomial decompositio...
AbstractIt is known (Ritt, 1923; Engstrom, 1941; Lévi, 1942; Dorey and Whaples, 1972) that over fiel...
Abstract. Let f(x) be a complex rational function. In this work, we study conditions under which f(x...
In this note, for any given real numbers a, b, c, we determine all the solutions f: R − → R of the f...
If g and h are functions over some field, we can consider their composition f = g(h). The inverse pr...
In this thesis, our main theorem gives the classification of all Laurent polynomials $f(X)$ such tha...
In this paper, we prove that infinite-dimensional vector spaces of α-dense curves are generated by m...
In this thesis, we shall prove some results which, in turn, will allow us to solve some factorizatio...
Let $P(z)$ and $Q(y)$ be polynomials of the same degree $k \geq 1$ in the complex variables $z$ and ...
AbstractBy introducing the concept of near-separated polynomial we extend to rational functions a th...
The factorization theory of meromorphic functions of one complex variable is to study how a given me...
AbstractIn this paper we give a new proof of a classical result by Fréchet [M. Fréchet, Une définiti...
AbstractIn 1922, Ritt [13] proved two remarkable theorems on decompositions of polynomial maps of C[...
In [R1]-[R4] J.F.Ritt proved some theorems concerning composition of (complex) rational functions. T...