The Discriminant and Conductor of Bicyclic Quartic Fields

It appears your Web browser is not configured to display PDF files. Download adobe Acrobat or click here to download the PDF file.

Click here to download the PDF file.

Creator: 

Turner, Graeme

Date: 

2017

Abstract: 

Let K be a bicyclic field of degree 4 over Q given in the form K = Q(θ) where θ^4 + Aθ^2 + Bθ + C = 0 for integers A, B and C. The discriminant d(K) and the conductor f(K) are explicitly determined in terms of A, B and C.

Subject: 

Mathematics

Language: 

English

Publisher: 

Carleton University

Thesis Degree Name: 

Doctor of Philosophy: 
Ph.D.

Thesis Degree Level: 

Doctoral

Thesis Degree Discipline: 

Mathematics

Parent Collection: 

Theses and Dissertations

Items in CURVE are protected by copyright, with all rights reserved, unless otherwise indicated. They are made available with permission from the author(s).