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Displaying 61 – 80 of 2019

A note on universal Hilbert sets.

Yuri Bilu (1996)

Journal für die reine und angewandte Mathematik

A p-adic behaviour of dynamical systems.

Stany De Smedt, Andrew Khrennikov (1999)

Revista Matemática Complutense

We study dynamical systems in the non-Archimedean number fields (i.e. fields with non-Archimedean valuation). The main results are obtained for the fields of p-adic numbers and complex p-adic numbers. Already the simplest p-adic dynamical systems have a very rich structure. There exist attractors, Siegel disks and cycles. There also appear new structures such as fuzzy cycles. A prime number p plays the role of parameter of a dynamical system. The behavior of the iterations depends on this parameter...

A partial factorization of the powersum formula.

Nahay, John Michael (2004)

International Journal of Mathematics and Mathematical Sciences

A polynomial solution to regulation and tracking. I. Deterministic problem

Vladimír Kučera, Michael Šebek (1984)

Kybernetika

A polynomial solution to regulation and tracking. II. Stochastic problem

Vladimír Kučera, Michael Šebek (1984)

Kybernetika

A problem on coefficient fields and equations over local rings

M. Van der Put (1975)

Compositio Mathematica

A projective invariant comparing rings of integers in wildly ramified extensions.

S.M.J. Wilson (1990)

Journal für die reine und angewandte Mathematik

A propos de la relation galoisienne $x_{1} = x_{2} + x_{3}$

Franck Lalande (2010)

Journal de Théorie des Nombres de Bordeaux

L’existence d’un polynôme $f$ , irréductible sur un corps $k$ de caractéristique $0$ et dont trois racines vérifient la relation linéaire $x_{1} = x_{2} + x_{3}$ , ne dépend que de la paire de groupes finis $(G, H)$ où $G = {Gal}_{k} (f)$ et $H \subset G$ est le fixateur d’une racine. Le cas régulier ( $H = 1$ ) est désormais assez bien décrit. On démontre dans ce texte que pour de nombreuses paires $(G, H)$ primitives ( $H$ sous-groupe maximal de $G$ ) et en particulier pour toutes celles de degré $\leq 50$ , la relation $x_{1} = x_{2} + x_{3}$ n’est pas réalisable.En appendice, Joseph Oesterlé démontre que cette...

À propos d'un théorème de Frobenius

Bruno Deschamps (2001)

Annales mathématiques Blaise Pascal

A question on the discriminants of involutions of central division algebras.

R. Sridharan, R. Parimala, V. Suresh (1993)

Mathematische Annalen

A quick and dirty irreducibility test for multivariate polynomials over $𝔽_{q}$ .

Graf von Bothmer, H.-C., Schreyer, F.-O. (2005)

Experimental Mathematics

A rational canonical form for matrix fields

J. Beard (1974)

Acta Arithmetica

A real nullstellensatz and positivstellensatz for the semipolynomials over an ordered field.

Laureano González-Vega, Henri Lombardi (1992)

Extracta Mathematicae

Let K be an ordered field and R its real closure. A semipolynomial will be defined as a function from Rn to R obtained by composition of polynomial functions and the absolute value. Every semipolynomial can be defined as a straight-line program containing only instructions with the following type: polynomial, absolute value, sup and inf and such a program will be called a semipolynomial expression. It will be proved, using the ordinary real positivstellensatz, a general real positivstellensatz concerning...

A really elementary proof of real Lüroth's theorem.

T. Recio, J. R. Sendra (1997)

Revista Matemática de la Universidad Complutense de Madrid

Classical Lüroth theorem states that every subfield K of K(t), where t is a transcendental element over K, such that K strictly contains K, must be K = K(h(t)), for some non constant element h(t) in K(t). Therefore, K is K-isomorphic to K(t). This result can be proved with elementary algebraic techniques, and therefore it is usually included in basic courses on field theory or algebraic curves. In this paper we study the validity of this result under weaker assumptions: namely, if K is a subfield...

Currently displaying 61 – 80 of 2019