In a recent joint work with Mingxi Wang, a version of Ritt's theory on the factorization of finite Blaschke products has been developed. In this Ritt's theory on the unit disk, a special class of finite Blaschke products has been introduced as the counterpart of Chebyshev polynomials in Ritt's theory for polynomials. These special finite Blaschke products are therefore called Chebyshev-Blaschke products. In this talk, I will explain the construction of them and also discuss some of their interesting properties
AbstractIn this paper we study when two finite Blaschke products commute. We complete previous resul...
We determine when a finite Blaschke product $B$ can be written, in a non-trivial way, as a compositi...
AbstractSeveral factorization properties of Chebyshev are reported here. Studying the euclidean divi...
The Speaker abstracts’ website is located at http://www.fields.utoronto.ca/programs/scientific/11-12...
The objective of the thesis is to compare polynomials and finite Blaschke products, and demonstrate ...
In this talk, we shall compare polynomials of one complex variable and finite Blaschke products and ...
The aim of this paper is to revisit Ritt's theory from a topological perspective by extensively usin...
This monograph offers an introduction to finite Blaschke products and their connections to complex a...
AbstractWe show how to construct all finite Blaschke product solutions and the minimal scaled Blasch...
This monograph offers an introduction to finite Blaschke products and their connections to complex a...
Abstract. These notes answer the question “When can a finite Blaschke product B be written as a comp...
In this talk, we shall consider the problem of characterizing those finite Blaschke products sharing...
We present four algorithms to determine whether or not a Blaschke product is a composition of two no...
AbstractBy connecting Blaschke products, unitary dilations of matrices, numerical range, Poncelet's ...
We provide a new proof of a theorem of Fujimura characterizing Blaschke products of degree-4 that ar...
AbstractIn this paper we study when two finite Blaschke products commute. We complete previous resul...
We determine when a finite Blaschke product $B$ can be written, in a non-trivial way, as a compositi...
AbstractSeveral factorization properties of Chebyshev are reported here. Studying the euclidean divi...
The Speaker abstracts’ website is located at http://www.fields.utoronto.ca/programs/scientific/11-12...
The objective of the thesis is to compare polynomials and finite Blaschke products, and demonstrate ...
In this talk, we shall compare polynomials of one complex variable and finite Blaschke products and ...
The aim of this paper is to revisit Ritt's theory from a topological perspective by extensively usin...
This monograph offers an introduction to finite Blaschke products and their connections to complex a...
AbstractWe show how to construct all finite Blaschke product solutions and the minimal scaled Blasch...
This monograph offers an introduction to finite Blaschke products and their connections to complex a...
Abstract. These notes answer the question “When can a finite Blaschke product B be written as a comp...
In this talk, we shall consider the problem of characterizing those finite Blaschke products sharing...
We present four algorithms to determine whether or not a Blaschke product is a composition of two no...
AbstractBy connecting Blaschke products, unitary dilations of matrices, numerical range, Poncelet's ...
We provide a new proof of a theorem of Fujimura characterizing Blaschke products of degree-4 that ar...
AbstractIn this paper we study when two finite Blaschke products commute. We complete previous resul...
We determine when a finite Blaschke product $B$ can be written, in a non-trivial way, as a compositi...
AbstractSeveral factorization properties of Chebyshev are reported here. Studying the euclidean divi...