Parametric families of polynomials : construction and applications
The focus of this thesis is on the study of parametric families of polynomials and in particular, their construction and applications. A method in constructing a family of parametric sextic trinomials defining sextic fields containing any cubic subfield is presented. We then show two applications...
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University of British Columbia
2013
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| Online Access: | http://hdl.handle.net/2429/44655 |
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ndltd-LACETR-oai-collectionscanada.gc.ca-BVAU.2429-446552014-03-26T03:39:31Z Parametric families of polynomials : construction and applications Lavallee, Melisa Jean The focus of this thesis is on the study of parametric families of polynomials and in particular, their construction and applications. A method in constructing a family of parametric sextic trinomials defining sextic fields containing any cubic subfield is presented. We then show two applications of our parametrization to obtain already established parameterizations of sextic trinomials defining sextic fields containing either a cyclic or pure cubic subfield. We then present three chapters illustrating the applications obtained from a parametric family of polynomials. Two such chapters illustrate that such families may yield an infinite number of monogenic fields. The other illustrates that such families may yield an infinite number of intersective polynomials. 2013-07-12T20:07:21Z 2013-07-13T09:09:28Z 2013 2013-07-12 2013-11 Electronic Thesis or Dissertation http://hdl.handle.net/2429/44655 eng University of British Columbia |
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NDLTD |
| language |
English |
| sources |
NDLTD |
| description |
The focus of this thesis is on the study of parametric families of polynomials and in particular, their construction and applications. A method in constructing a family of parametric sextic trinomials defining sextic fields containing any cubic subfield is presented. We then show two applications of our parametrization to obtain already established parameterizations of sextic trinomials defining sextic fields containing either a cyclic or pure cubic subfield. We then present three chapters illustrating the applications obtained from a parametric family of polynomials. Two such chapters illustrate that such families may yield an infinite number of monogenic fields. The other illustrates that such families may yield an infinite number of intersective polynomials. |
| author |
Lavallee, Melisa Jean |
| spellingShingle |
Lavallee, Melisa Jean Parametric families of polynomials : construction and applications |
| author_facet |
Lavallee, Melisa Jean |
| author_sort |
Lavallee, Melisa Jean |
| title |
Parametric families of polynomials : construction and applications |
| title_short |
Parametric families of polynomials : construction and applications |
| title_full |
Parametric families of polynomials : construction and applications |
| title_fullStr |
Parametric families of polynomials : construction and applications |
| title_full_unstemmed |
Parametric families of polynomials : construction and applications |
| title_sort |
parametric families of polynomials : construction and applications |
| publisher |
University of British Columbia |
| publishDate |
2013 |
| url |
http://hdl.handle.net/2429/44655 |
| work_keys_str_mv |
AT lavalleemelisajean parametricfamiliesofpolynomialsconstructionandapplications |
| _version_ |
1716656763114094592 |