On real and p-adic Bezoutians

Adduci, Silvia María

07 January 2011

We study the quadratic form induced by the Bezoutian of two polynomials p and q, considering four problems. First, over R, in the separable case we count the number of configurations of real roots of p and q for which the Bezoutian has a fixed signature. Second, over Qp we develop a formula for the Hasse invariant of the Bezoutian. Third, we formulate a conjecture for the behavior of the Bezoutian in the non separable case, and offer a proof over R. We wrote a Pari code to test it over Qp and Q and found no counterexamples. Fourth, we state and prove a theorem that we hope will help prove the conjecture in the near future. / text

Bezoutian

p-adic

Interlacing

Hasse invariant

Cohomological Invariants of Quadratic Forms

Harvey, Ebony Ann

January 2010

Thesis advisor: Benjamin V. Howard / Given a field <italic>F</italic>, an algebraic closure <italic>K</italic> and an <italic>F</italic>-vector space <italic>V</italic>, we can tensor the space <italic>V</italic> with the algebraic closure <italic>K</italic>. Two quadratic spaces of the same dimension become isomorphic when tensored with an algebraic closure. The failure of this isomorphism over <italic>F</italic> is measured by the Hasse invariant. This paper explains how the determinants and Hasse Invariants of quadratic forms are related to certain cohomology classes constructed from specific short exact sequences. In particular, the Hasse Invariant is defined as an element of the Brauer group. / Thesis (MA) — Boston College, 2010. / Submitted to: Boston College. Graduate School of Arts and Sciences. / Discipline: Mathematics.

Central Simple Algebra

cocycles and coboundaries

Cohomology

factor sets

Hasse Invariant

Quadratic Forms

Forma traço sobre algumas extensões galoisianas de corpos p-Ádicos

Prado, Janete do [UNESP]

28 February 2005

Made available in DSpace on 2014-06-11T19:26:55Z (GMT). No. of bitstreams: 0 Previous issue date: 2005-02-28Bitstream added on 2014-06-13T20:08:01Z : No. of bitstreams: 1 prado_j_me_sjrp.pdf: 438115 bytes, checksum: 072493cefd49a6603f89810da896f173 (MD5) / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior (CAPES) / Seja K um corpo p-ádico, com p 6= 2 e F K uma extensão galoisiana de K de grau n: Então F pode ser visto como espa»co quadrático sobre K, com a forma quadrática dada por T(x) = trFjK(x2), para x 2 F: Determinaremos os invariantes determinante, dimensão e invariante de Hasse desta forma quadrática para n igual a 2,3 e 4. / Let K be a p-adic eld with p 6= 2 and F a Galois extension eld of K of degree n: Then F can be viewed as a quadratic space over K under the quadratic form T(x) = trFjK(x2) for x 2 F. The invariants of this quadratic form dimension, determinant and Hasse invariant are given in the case when n is equal to 2,3 and 4.

Álgebra

Invariantes

Corpos locais (Algebra)

Extensões de corpos (Matematica)

Forma quadrática

Forma traço

Quadratic form

Trace form

Hasse invariant

p-Adic field

Forma traço sobre algumas extensões galoisianas de corpos p-Ádicos /

Prado, Janete do.

January 2005

Orientador: Clotilzio Moreira dos Santos / Banca: Ires Dias / Banca: Aparecida Francisco da Silva / Resumo: Seja K um corpo p-ádico, com p 6= 2 e F K uma extensão galoisiana de K de grau n: Então F pode ser visto como espa»co quadrático sobre K, com a forma quadrática dada por T(x) = trFjK(x2), para x 2 F: Determinaremos os invariantes determinante, dimensão e invariante de Hasse desta forma quadrática para n igual a 2,3 e 4. / Let K be a p-adic eld with p 6= 2 and F a Galois extension eld of K of degree n: Then F can be viewed as a quadratic space over K under the quadratic form T(x) = trFjK(x2) for x 2 F. The invariants of this quadratic form dimension, determinant and Hasse invariant are given in the case when n is equal to 2,3 and 4. / Mestre

Álgebra.

Invariantes.

Corpos locais (Algebra)

Extensões de corpos (Matematica)

Quadratic form. eng

Trace form. eng

Hasse invariant. eng

p-Adic field. eng