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You searched for +publisher:"University of Arizona" +contributor:("Velez, William"). Showing records 1 – 2 of 2 total matches.

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University of Arizona

1. ACOSTA DE OROZCO, MARIA TEODORA. FIELDS DEFINED BY RADICALS: THEIR TORSION GROUP AND THEIR LATTICE OF SUBFIELDS.

Degree: 1987, University of Arizona

Let L/F be a finite separable extension. L* = L{0}, and T(L*/F*) be the torsion subgroup of L*/F*. We explicitly determined T(L*/F*) when L/F is an abelian extension. This information is used to study the structure of T(L*/F*). In particular T(F(α)*/F*) when αᵐ = a ∈ F is explicitly determined. Let Xᵐ - a be irreducible over F with char F χ m and let α be a root of Xᵐ - a. We study the lattice of subfields of F(α)/F and to this end C(F(α)/F,k) is defined to be the number of subfields of F(α) of degree k over F. C(f(α)/F,pⁿ) is explicitly determined for p a prime and the following structure theorem for the lattice of subfields is proved. Let N be the maximal normal subfield of F(α) and set n = [N:F], then C(F(α)/F,k) = C(F(α)/F,(k,n)) = C(N/F,(k,n)). The irreducible binomials X⁸ - b, X⁸ - c are said be equivalent if there exist roots β⁸ = b, γ⁸ = c that F(β) = F(γ). All the mutually inequivalent binomials which have roots in F(α) are determined. These results are applied the study of normal binomials and those irreducible binomials X²ᵉ - a which are normal over F(charF ≠ 2) together their Galois groups are characterized. We finished by considering the radical extension F(α)/F, αᵐ ∈ F, where the binominal Xᵐ - αᵐ is not necessarily irreducible. We see that in the case not every subfield of F(α)/F is the compositum of subfields of prime power order. We determine some conditions such that if F ⊆ H ⊆ F(α) with [H:F] = pᵘq, p a prime, (p,q) = 1, then there exists a subfield F ⊆ R ⊆ H where [R:F] = pᵘ. Advisors/Committee Members: Velez, William Yslas (advisor).

Subjects/Keywords: Torsion theory (Algebra); Lattice theory.

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6th Edition):

ACOSTA DE OROZCO, M. T. (1987). FIELDS DEFINED BY RADICALS: THEIR TORSION GROUP AND THEIR LATTICE OF SUBFIELDS. (Doctoral Dissertation). University of Arizona. Retrieved from http://hdl.handle.net/10150/184040

Chicago Manual of Style (16th Edition):

ACOSTA DE OROZCO, MARIA TEODORA. “FIELDS DEFINED BY RADICALS: THEIR TORSION GROUP AND THEIR LATTICE OF SUBFIELDS. ” 1987. Doctoral Dissertation, University of Arizona. Accessed December 05, 2020. http://hdl.handle.net/10150/184040.

MLA Handbook (7th Edition):

ACOSTA DE OROZCO, MARIA TEODORA. “FIELDS DEFINED BY RADICALS: THEIR TORSION GROUP AND THEIR LATTICE OF SUBFIELDS. ” 1987. Web. 05 Dec 2020.

Vancouver:

ACOSTA DE OROZCO MT. FIELDS DEFINED BY RADICALS: THEIR TORSION GROUP AND THEIR LATTICE OF SUBFIELDS. [Internet] [Doctoral dissertation]. University of Arizona; 1987. [cited 2020 Dec 05]. Available from: http://hdl.handle.net/10150/184040.

Council of Science Editors:

ACOSTA DE OROZCO MT. FIELDS DEFINED BY RADICALS: THEIR TORSION GROUP AND THEIR LATTICE OF SUBFIELDS. [Doctoral Dissertation]. University of Arizona; 1987. Available from: http://hdl.handle.net/10150/184040


University of Arizona

2. Barrera Mora, Jose Felix Fernando. On radical extensions and radical towers.

Degree: 1989, University of Arizona

Let K/F be a separable extension. (i) If K = F(α) with αⁿ ∈ F for some n, K/F is said to be a radical extension. (ii) If there exists a sequence of fields F = F₀ ⊆ F₁ ⊆ ... ⊆ F(s) = K so that Fᵢ₊₁ = Fᵢ(αᵢ) with αᵢⁿ⁽ⁱ⁾ ∈ Fᵢ for some nᵢ ∈ N, charF ∧nᵢ for every i, and [Fᵢ₊₁ : Fᵢ] = nᵢ, K/F is said to be a radical tower. In the first part of this work, we present two theorems which give sufficient conditions for a field extension K/F to be radical. In the second part, we present results which provide conditions under which every subfield of a radical tower is also a radical tower. Advisors/Committee Members: Velez, William (advisor), Grove, Larry (committeemember), Gay, David (committeemember).

Subjects/Keywords: Field extensions (Mathematics); Abelian groups.

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6th Edition):

Barrera Mora, J. F. F. (1989). On radical extensions and radical towers. (Doctoral Dissertation). University of Arizona. Retrieved from http://hdl.handle.net/10150/184833

Chicago Manual of Style (16th Edition):

Barrera Mora, Jose Felix Fernando. “On radical extensions and radical towers. ” 1989. Doctoral Dissertation, University of Arizona. Accessed December 05, 2020. http://hdl.handle.net/10150/184833.

MLA Handbook (7th Edition):

Barrera Mora, Jose Felix Fernando. “On radical extensions and radical towers. ” 1989. Web. 05 Dec 2020.

Vancouver:

Barrera Mora JFF. On radical extensions and radical towers. [Internet] [Doctoral dissertation]. University of Arizona; 1989. [cited 2020 Dec 05]. Available from: http://hdl.handle.net/10150/184833.

Council of Science Editors:

Barrera Mora JFF. On radical extensions and radical towers. [Doctoral Dissertation]. University of Arizona; 1989. Available from: http://hdl.handle.net/10150/184833

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