Add to ORKGWe study the problem of simultaneous approximation to a fixed family of real and p-adic numbers by roots of integer polynomials of restricted type. The method that we use for this purpose was developed by H. Davenport and W.M. Schmidt in their study of approximation to real numbers by algebraic integers. This method based on Mahler's Duality requires to study the dual problem of approximation to successive powers of these numbers by rational numbers with the same denominators. Dirichlet's Box Principle provides estimates for such approximations but one can do better. In this thesis we establish constraints on how much better one can do when dealing with the numbers and their squares. We also construct examples showing that at least in some ...
AbstractLet n be an integer ≥ 1 and let θ be a real number which is not an algebraic number of degre...
In 1969, Davenport and Schmidt provided upper bounds for the approximation of a real number by algeb...
In this paper we consider simultaneous approximations to algebraic numbers a1,...,am
In this thesis, we study the problem of simultaneous approximation to a fixed family of real and p-a...
One of the fundamental problems in Diophantine approximation is approximation to real numbers by alg...
AbstractThe approximation of p-adic numbers by algebraic numbers of bounded degree is studied. Resul...
An important aspect of Diophantine Approximation deals with the problem of approximating real or com...
AbstractDuring the last 10 years the classical Khintchine theorem on approximation of real numbers b...
The section 4 of this new version has been rewritten to simplify the proof of the main result. Other...
AbstractThe approximation of p-adic numbers by algebraic numbers of bounded degree is studied. Resul...
A lower bound for the number of integer polynomials which simultaneously have “close” complex roots ...
A lower bound for the number of integer polynomials which simultaneously have “close” complex roots ...
A lower bound for the number of integer polynomials which simultaneously have “close” complex roots ...
A lower bound for the number of integer polynomials which simultaneously have “close” complex roots ...
The author uses an elementary lemma on primes dividing bino-mial coecients and estimates for primes ...
AbstractLet n be an integer ≥ 1 and let θ be a real number which is not an algebraic number of degre...
In 1969, Davenport and Schmidt provided upper bounds for the approximation of a real number by algeb...
In this paper we consider simultaneous approximations to algebraic numbers a1,...,am
In this thesis, we study the problem of simultaneous approximation to a fixed family of real and p-a...
One of the fundamental problems in Diophantine approximation is approximation to real numbers by alg...
AbstractThe approximation of p-adic numbers by algebraic numbers of bounded degree is studied. Resul...
An important aspect of Diophantine Approximation deals with the problem of approximating real or com...
AbstractDuring the last 10 years the classical Khintchine theorem on approximation of real numbers b...
The section 4 of this new version has been rewritten to simplify the proof of the main result. Other...
AbstractThe approximation of p-adic numbers by algebraic numbers of bounded degree is studied. Resul...
A lower bound for the number of integer polynomials which simultaneously have “close” complex roots ...
A lower bound for the number of integer polynomials which simultaneously have “close” complex roots ...
A lower bound for the number of integer polynomials which simultaneously have “close” complex roots ...
A lower bound for the number of integer polynomials which simultaneously have “close” complex roots ...
The author uses an elementary lemma on primes dividing bino-mial coecients and estimates for primes ...
AbstractLet n be an integer ≥ 1 and let θ be a real number which is not an algebraic number of degre...
In 1969, Davenport and Schmidt provided upper bounds for the approximation of a real number by algeb...
In this paper we consider simultaneous approximations to algebraic numbers a1,...,am