We explicitly describe a noteworthy transcendental continued fraction in the field of power series over Q, having irrationality measure equal to 3. This continued fraction is a generating function of a particular sequence in the set {1, 2}. The origin of this sequence, whose study was initiated in a recent paper, is to be found in another continued fraction, in the field of power series over $\mathbb{F}_3$, which satisfies a simple algebraic equation of degree 4, introduced thirty years ago by D. Robbins
AbstractLet F be an arbitrary field and let K = F((x−1)) be the field of formal Laurent series in x−...
The aim of this note is to show the existence of a correspondance between certain algebraic continue...
Abstract: In this paper, we consider continued fraction expansions for algebraic power series over a...
International audienceWe explicitly describe a noteworthy transcendental continued fraction in the f...
Casually introduced thirty years ago, a simple algebraic equation of degree 4 with coefficients in F...
We discuss the continued fraction expansion, in the field of power series over a finite prime field,...
An irrational power series over a finite field F_q of characteristic p is called hyperquadratic if i...
AbstractAn irrational power series over a finite field Fq of characteristic p is called hyperquadrat...
The first part of this note is a short introduction on continued fraction expansions for certain alg...
There exists a particular subset of algebraic power series over a finite field which, for different ...
AbstractThe continued fraction expansion for a quartic power series over the finite field F13 was co...
A continued fraction expansion for a quartic power series over F_13 was conjectured by David Robbins...
AbstractIn a recent paper M. Buck and D. Robbins have given the continued fraction expansion of an a...
In 1986, some examples of algebraic, and nonquadratic, power series over a fi?nite prime ?field, hav...
It is widely believed that the continued fraction expansion of every irrational algebraic number $\a...
AbstractLet F be an arbitrary field and let K = F((x−1)) be the field of formal Laurent series in x−...
The aim of this note is to show the existence of a correspondance between certain algebraic continue...
Abstract: In this paper, we consider continued fraction expansions for algebraic power series over a...
International audienceWe explicitly describe a noteworthy transcendental continued fraction in the f...
Casually introduced thirty years ago, a simple algebraic equation of degree 4 with coefficients in F...
We discuss the continued fraction expansion, in the field of power series over a finite prime field,...
An irrational power series over a finite field F_q of characteristic p is called hyperquadratic if i...
AbstractAn irrational power series over a finite field Fq of characteristic p is called hyperquadrat...
The first part of this note is a short introduction on continued fraction expansions for certain alg...
There exists a particular subset of algebraic power series over a finite field which, for different ...
AbstractThe continued fraction expansion for a quartic power series over the finite field F13 was co...
A continued fraction expansion for a quartic power series over F_13 was conjectured by David Robbins...
AbstractIn a recent paper M. Buck and D. Robbins have given the continued fraction expansion of an a...
In 1986, some examples of algebraic, and nonquadratic, power series over a fi?nite prime ?field, hav...
It is widely believed that the continued fraction expansion of every irrational algebraic number $\a...
AbstractLet F be an arbitrary field and let K = F((x−1)) be the field of formal Laurent series in x−...
The aim of this note is to show the existence of a correspondance between certain algebraic continue...
Abstract: In this paper, we consider continued fraction expansions for algebraic power series over a...