On the prime values represented by polynomials
Many conjectures have been made concerning the infinitude of prime values assumed by the irreducible polynomials in Z[x]. The most general thus far is the Bateman-Horn conjecture. While the Bateman-Horn conjecture remains open, “on average” results have been given by Baier and Zhao [BZ2], [BZ4] for...
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sg-ntu-dr.10356-537142023-02-28T23:58:28Z On the prime values represented by polynomials Foo, Timothy Zhao Liangyi School of Physical and Mathematical Sciences DRNTU::Science::Mathematics Many conjectures have been made concerning the infinitude of prime values assumed by the irreducible polynomials in Z[x]. The most general thus far is the Bateman-Horn conjecture. While the Bateman-Horn conjecture remains open, “on average” results have been given by Baier and Zhao [BZ2], [BZ4] for quadratic polynomials. The Hardy-Littlewood circle method is the primary tool used in [BZ2]. Here, we use the circle method to extend [BZ2] to cubic polynomials. To this end, we need to use the large sieve for cubic Dirichlet characters due to Baier and Young [BY], a large sieve for algebraic number fields due to M.N. Huxley [H], Artin reciprocity, and bounds for exponential sums. We also discuss what might be needed for higher degree polynomials. Furthermore, we discuss an application of the Bateman-Horn conjecture to the density of suitably normalized polynomial roots to prime moduli in the unit interval. Doctor of Philosophy (SPMS) 2013-06-07T02:02:20Z 2013-06-07T02:02:20Z 2011 2011 Thesis http://hdl.handle.net/10356/53714 en 79 p. application/pdf |
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DRNTU::Science::Mathematics Foo, Timothy On the prime values represented by polynomials |
| description |
Many conjectures have been made concerning the infinitude of prime values assumed by the irreducible polynomials in Z[x]. The most general thus far is the Bateman-Horn conjecture. While the Bateman-Horn conjecture remains open, “on average” results have been given by Baier and Zhao [BZ2], [BZ4] for quadratic polynomials. The Hardy-Littlewood circle method is the primary tool used in [BZ2]. Here, we use the circle method to extend [BZ2] to cubic polynomials. To this end, we need to use the large sieve for cubic Dirichlet characters due to Baier and Young [BY], a large sieve for algebraic number fields due to M.N. Huxley [H], Artin reciprocity, and bounds for exponential sums. We also discuss what might be needed for higher degree polynomials. Furthermore, we discuss an application of the Bateman-Horn conjecture to the density of suitably normalized polynomial roots to prime moduli in the unit interval. |
| author2 |
Zhao Liangyi |
| author_facet |
Zhao Liangyi Foo, Timothy |
| format |
Theses and Dissertations |
| author |
Foo, Timothy |
| author_sort |
Foo, Timothy |
| title |
On the prime values represented by polynomials |
| title_short |
On the prime values represented by polynomials |
| title_full |
On the prime values represented by polynomials |
| title_fullStr |
On the prime values represented by polynomials |
| title_full_unstemmed |
On the prime values represented by polynomials |
| title_sort |
on the prime values represented by polynomials |
| publishDate |
2013 |
| url |
http://hdl.handle.net/10356/53714 |
| _version_ |
1759857863046463488 |