Add to ORKGOne of the fundamental problems in Diophantine approximation is approximation to real numbers by algebraic numbers of bounded degree. In 1969, H. Davenport and W. M. Schmidt developed a new method to approach the problem. This method combines a result on simultaneous approximation to successive powers of a real number xi with geometry of numbers. For now, the only case where the estimates are optimal is the case of two consecutive powers. Davenport and Schmidt show that if a real number xi is such that 1, xi, xi² are linearly independent over Q , then the exponent of simultaneous approximation to xi and xi² by rational numbers with the same denominator is at most ( 5 - 1}/2 = 0.618..., the inverse of the Golden ratio. In this ...
AbstractLower bounds are obtained on the simultaneous diophantine approximation of some values of ce...
Abstract. We construct families of non-quadratic algebraic laurent series (over finite fields of any...
The original problem of Diophantine approximation, which goes back to the famous 1842 theorem of Dir...
An important aspect of Diophantine Approximation deals with the problem of approximating real or com...
We study the problem of simultaneous approximation to a fixed family of real and p-adic numbers by r...
In this thesis, we study the problem of simultaneous approximation to a fixed family of real and p-a...
In this paper we consider simultaneous approximations to algebraic numbers a1,...,am
AbstractLet n be an integer ≥ 1 and let θ be a real number which is not an algebraic number of degre...
AbstractLet α = (a1B,…, anB) be a vector of rational numbers satisfying the primitivity condition g....
The study of approximation to a real number by algebraic numbers of bounded degree started with a pa...
In 1969, Davenport and Schmidt provided upper bounds for the approximation of a real number by algeb...
AbstractLet n be an integer ≥ 1 and let θ be a real number which is not an algebraic number of degre...
We present a hypergeometric construction of rational approximations to ζ(2) and ζ(3) which allows on...
In this article we formalize some results of Diophantine approximation, i.e. the approximation of an...
to be published by Springer Verlag, Special volume in honor of Serge Lang, ed. Dorian Goldfeld, Jay ...
AbstractLower bounds are obtained on the simultaneous diophantine approximation of some values of ce...
Abstract. We construct families of non-quadratic algebraic laurent series (over finite fields of any...
The original problem of Diophantine approximation, which goes back to the famous 1842 theorem of Dir...
An important aspect of Diophantine Approximation deals with the problem of approximating real or com...
We study the problem of simultaneous approximation to a fixed family of real and p-adic numbers by r...
In this thesis, we study the problem of simultaneous approximation to a fixed family of real and p-a...
In this paper we consider simultaneous approximations to algebraic numbers a1,...,am
AbstractLet n be an integer ≥ 1 and let θ be a real number which is not an algebraic number of degre...
AbstractLet α = (a1B,…, anB) be a vector of rational numbers satisfying the primitivity condition g....
The study of approximation to a real number by algebraic numbers of bounded degree started with a pa...
In 1969, Davenport and Schmidt provided upper bounds for the approximation of a real number by algeb...
AbstractLet n be an integer ≥ 1 and let θ be a real number which is not an algebraic number of degre...
We present a hypergeometric construction of rational approximations to ζ(2) and ζ(3) which allows on...
In this article we formalize some results of Diophantine approximation, i.e. the approximation of an...
to be published by Springer Verlag, Special volume in honor of Serge Lang, ed. Dorian Goldfeld, Jay ...
AbstractLower bounds are obtained on the simultaneous diophantine approximation of some values of ce...
Abstract. We construct families of non-quadratic algebraic laurent series (over finite fields of any...
The original problem of Diophantine approximation, which goes back to the famous 1842 theorem of Dir...