Wilson, Cameron (2025) Local solubility of a family of quadric surfaces over a biprojective base. PhD thesis, University of Glasgow.

Full text available as:

PDF Download (1MB)

Abstract

We prove an asymptotic formula for the number of everywhere locally soluble diagonal quadric surfaces 𝑦₀𝑥²₀+𝑦₁𝑥²₁+𝑦₂𝑥²₂+𝑦₃𝑥²₃=0 parametrised by points 𝑦 ∈ ℙ³ (ℚ) lying on the split quadric surface 𝑦₀𝑦₁ = 𝑦₂𝑦₃ which do not satisfy −𝑦₀𝑦₂ = □ nor −𝑦₀𝑦₃ = □. Our methods involve proving asymptotic formulae for character sums with a hyperbolic height condition and proving variations of large sieve inequalities for quadratic characters.

Item Type:	Thesis (PhD)
Qualification Level:	Doctoral
Additional Information:	Funding for the Ph.D has been provided by the Carnegie Trust for the Universities of Scotland.
Subjects:	Q Science > QA Mathematics
Colleges/Schools:	College of Science and Engineering > School of Mathematics and Statistics
Funder's Name:	Carnegie Trust for the Universities of Scotland (CARNEGTR)
Supervisor's Name:	Sofos, Dr. Efthymios and Bartel, Professor Alex
Date of Award:	2025
Depositing User:	Theses Team
Unique ID:	glathesis:2025-85541
Copyright:	Copyright of this thesis is held by the author.
Date Deposited:	27 Oct 2025 11:52
Last Modified:	27 Oct 2025 11:52
Thesis DOI:	10.5525/gla.thesis.85541
URI:	https://theses.gla.ac.uk/id/eprint/85541

Actions (login required)

View Item

Downloads