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We depart from our approximation of 2000 of all root radii of a polynomial, which has readily extended Sch{\"o}nhage's efficient algorithm of 1982 for a single root radius. We revisit this extension, advance it, based on our simple but…

Symbolic Computation · Computer Science 2021-07-05 Rémi Imbach , Victor Y. Pan

We obtain upper bounds on the number of irreducible and extended irreducible Goppa codes over $GF(p)$ of length $q$ and $q+1$, respectively defined by polynomials of degree $r$, where $q=p^t$ and $r\geq 3$ is a positive integer.

Number Theory · Mathematics 2019-04-08 Kondwani Magamba , John A. Ryan

We give the first known bound for orders of differentiations in differential Nullstellensatz for both partial and ordinary algebraic differential equations. This problem was previously addressed by A. Seidenberg but no complete solution was…

Commutative Algebra · Mathematics 2013-03-05 Oleg Golubitsky , Marina Kondratieva , Alexey Ovchinnikov , Agnes Szanto

Our probabilistic analysis sheds light to the following questions: Why do random polynomials seem to have few, and well separated real roots, on the average? Why do exact algorithms for real root isolation may perform comparatively well or…

Symbolic Computation · Computer Science 2010-06-01 Ioannis Z. Emiris , André Galligo , Elias Tsigaridas

Irreducible trinomials of given degree n over $F_2$ do not always exist and in the cases that there is no irreducible trinomial of degree n it may be effective to use trinomials with an irreducible factor of degree n. In this paper we…

Rings and Algebras · Mathematics 2014-01-30 Ryul Kim , Wolfram Koepf

This paper presents new six solutions for sixth degree polynomial equation in general forms basing on new theorems, where the possibility to calculate the six roots of any sixth degree equation nearly simultaneously. The proposed roots for…

General Mathematics · Mathematics 2022-11-16 Yassine Larbaoui

In this article, we consider the polynomials of the form $f(x)=a_0+a_1x+a_2x^2+\cdots+a_nx^n\in \mathbb{Z}[x],$ where $|a_0|=|a_1|+\dots+|a_n|$ and $|a_0|$ is a prime. We show that these polynomials have a cyclotomic factor whenever…

Number Theory · Mathematics 2020-06-09 Biswajit Koley , A. Satyanarayana Reddy

We give all bi-unitary non splitting even perfect polynomials over the prime field of two elements, which are divisible by Mersenne irreducible polynomials raised to special exponents. We also identify all bi-unitary perfect polynomials…

Number Theory · Mathematics 2022-05-10 Olivier Rahavandrainy

Let $\mathbb F_q$ be the finite field with $q$ elements, $f, g\in \mathbb F_q[x]$ be polynomials of degree at least one. This paper deals with the asymptotic growth of certain arithmetic functions associated to the factorization of the…

Number Theory · Mathematics 2019-08-06 Lucas Reis

We are interested in irrationality of roots for seven important families of polynomials : Tchebichef polynomials, Legendre polynomials, Laguerre polynomials, Hermite polynomials, Bessel polynomials, Bernoulli polynomials and Euler…

Number Theory · Mathematics 2017-07-26 Lionel Ponton

Let $F(x)$ be an irreducible polynomial with integer coefficients and degree at least 2. For $x\ge z\ge y\ge 2$, denote by $H_F(x, y, z)$ the number of integers $n\le x$ such that $F(n)$ has at least one divisor $d$ with $y<d\le z$. We…

Number Theory · Mathematics 2022-07-05 Kevin Ford , Guoyou Qian

Let $G$ be a finite group and $d$ the degree of a complex irreducible character of $G$, then write $|G|=d(d+e)$ where $e$ is a nonnegative integer. We prove that $|G|\leq e^4-e^3$ whenever $e>1$. This bound is best possible and improves on…

Group Theory · Mathematics 2015-05-20 Nguyen Ngoc Hung , Mark L. Lewis , Amanda A. Schaeffer Fry

Arthur Cohn's irreducibility criterion for polynomials with integer coefficients and its generalization connect primes to irreducibles, and integral bases to the variable $x$. As we follow this link, we find that these polynomials are ready…

Number Theory · Mathematics 2018-09-05 Fusun Akman

Let $\mathcal{F}_n$ be the set of unitary polynomials of degree $n \ge 2$ that have their roots in $\mathbb{Z}^*$. We note $$ Q(x) := x^n+a_{1}x^{n-1}+\dots+a_{n}. $$ We show that any two fixed consecutive coefficients $(a_{j},a_{j+1})$ ($j…

Number Theory · Mathematics 2019-11-04 Patrick Letendre

Let GF(q), q=p^r, be a finite field with a primitive element g. In this paper we use exponential sums and Jacobi sums to compute the number of the irreducible polynomials of degree m over GF(q) with trace fixed and norm restricted to a…

Number Theory · Mathematics 2007-10-16 K. Kononen , M. Moisio , M. Rinta-aho , K. Vaananen

We explore when it is legal to differentiate a polynomial evaluated at a root of unity using modular arithmetic.

Number Theory · Mathematics 2020-01-13 Alice Devillers , S. P. Glasby

In this paper we construct an infinite sequence of binary irreducible polynomials starting from any irreducible polynomial $f_0 \in \F_2 [x]$. If $f_0$ is of degree $n = 2^l \cdot m$, where $m$ is odd and $l$ is a non-negative integer,…

Dynamical Systems · Mathematics 2013-08-27 Simone Ugolini

We give an explicit upper bound for the number of equivalence classes of binary forms with rational integral coefficients of given degree and given discriminant, and with given splitting field. Further, we give an explicit upper bound for…

Number Theory · Mathematics 2015-06-26 Attila Berczes , Jan-Hendrik Evertse , Kalman Gyory

We develop the theory of resolvent degree, introduced by Brauer \cite{Br} in order to study the complexity of formulas for roots of polynomials and to give a precise formulation of Hilbert's 13th Problem. We extend the context of this…

Algebraic Geometry · Mathematics 2020-01-23 Benson Farb , Jesse Wolfson

We present a formula for the degree of the discriminant of irreducible representations of a Lie group, in terms of the roots of the group and the highest weight of the representation. The proof uses equivariant cohomology techniques,…

Algebraic Geometry · Mathematics 2007-08-22 L. M. Feher , A. Nemethi , R. Rimanyi
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