Add to ORKGIn this paper we show that for each k ∈ N there are innitely many algebraic integers with norm k and absolute normalized size smaller than 1. We also show that the lower bound (n+s log 2)=2 on the square of the absolute size ∥α∥ of an algebraic integer α of degree n with exactly s real conjugates over Q is best possible for each even s ≥ 2. For this, for each pair s; k ∈ N, where s is even, we construct algebraic integers α with exactly s real conjugates and norm of modulus k satisfying deg α = n and ∥α∥2 = (n+s log 2)=2+log k +O(n-1) as n → ∞. Finally, using the third smallest Pisot number θ3, which is the root of the polynomial x5-x4-x3+x2-1, we construct algebraic integers α of degree n that have exactly one real conjugate and satisfy ∥α...
AbstractLetA(x)=adxd+…+a0be the minimal polynomial ofαover Z. Recall that the denominator ofα, denot...
Bernik VI, Götze F. Distribution of real algebraic numbers of arbitrary degree in short intervals. I...
AbstractWe produce a lower bound for |α − 1| when α is an algebraic number with relatively small hei...
In this paper we show that the relative normalised size with respect to a number field K of an algeb...
For P 2 Z[x], let kPk denote the Euclidean norm of the coefficient vector of P. For an algebraic num...
Abstract. Real algebraic numbers are the real numbers that are real roots of univariate polynomials ...
International audienceLet α be a nonzero algebraic integer of degree d whose all conjugates α 1 = α,...
International audienceLet α be a nonzero algebraic integer of degree d whose all conjugates α 1 = α,...
For a real number x, we let x be the closest integer to x. In this paper, we look at the arithmetic ...
AbstractFor totally positive algebraic integers α of degree d(α), we study the set of values of R1(α...
AbstractFor totally positive algebraic integers α of degree d(α), we study the set of values of R1(α...
Let $\alpha $ be a real algebraic number greater than $1$. We establish an effective lower bound for...
In this paper, we study the field of algebraic numbers with a set of elements of small height treate...
In this paper, we study the field of algebraic numbers with a set of elements of small height treate...
Let p∈Z[x] be an arbitrary polynomial of degree n with k non-zero integer coefficients of absolute v...
AbstractLetA(x)=adxd+…+a0be the minimal polynomial ofαover Z. Recall that the denominator ofα, denot...
Bernik VI, Götze F. Distribution of real algebraic numbers of arbitrary degree in short intervals. I...
AbstractWe produce a lower bound for |α − 1| when α is an algebraic number with relatively small hei...
In this paper we show that the relative normalised size with respect to a number field K of an algeb...
For P 2 Z[x], let kPk denote the Euclidean norm of the coefficient vector of P. For an algebraic num...
Abstract. Real algebraic numbers are the real numbers that are real roots of univariate polynomials ...
International audienceLet α be a nonzero algebraic integer of degree d whose all conjugates α 1 = α,...
International audienceLet α be a nonzero algebraic integer of degree d whose all conjugates α 1 = α,...
For a real number x, we let x be the closest integer to x. In this paper, we look at the arithmetic ...
AbstractFor totally positive algebraic integers α of degree d(α), we study the set of values of R1(α...
AbstractFor totally positive algebraic integers α of degree d(α), we study the set of values of R1(α...
Let $\alpha $ be a real algebraic number greater than $1$. We establish an effective lower bound for...
In this paper, we study the field of algebraic numbers with a set of elements of small height treate...
In this paper, we study the field of algebraic numbers with a set of elements of small height treate...
Let p∈Z[x] be an arbitrary polynomial of degree n with k non-zero integer coefficients of absolute v...
AbstractLetA(x)=adxd+…+a0be the minimal polynomial ofαover Z. Recall that the denominator ofα, denot...
Bernik VI, Götze F. Distribution of real algebraic numbers of arbitrary degree in short intervals. I...
AbstractWe produce a lower bound for |α − 1| when α is an algebraic number with relatively small hei...
