Counting Lattice Points on Determinant Surfaces

Guria, Rachita (2023) Counting Lattice Points on Determinant Surfaces. PhD thesis, Indian Institute of Science Education and Research Kolkata.

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Abstract

In this thesis we obtain asymptotic formulae for three counting problems. First, for the number of integer solutions (a, b, c, d) to the determinant equations xy −zw = r ̸= 0 lying in an expanding box [−X,X]⁴ with X −→ ∞. Second, for the same counting problem, where we now count the solutions with smooth weights of the form w(a/X),w(b/X), · · · , where w is a compactly supported smooth function; and third, for the number of 2 × 2 integer matrices with fixed trace and determinant where we count with smooth weights as in the second problem.

Item Type: Thesis (PhD)
Additional Information: Supervisor: Dr. Subrata Shyam Roy; Joint Supervisor: Dr. Satadal Ganguly
Uncontrolled Keywords: Analytic Number Theory; Asymptotic Formulae; Determinant Surfaces; Integral Points
Subjects: Q Science > QA Mathematics
Divisions: Department of Mathematics and Statistics
Depositing User: IISER Kolkata Librarian
Date Deposited: 12 Dec 2023 09:34
Last Modified: 12 Dec 2023 09:34
URI: http://eprints.iiserkol.ac.in/id/eprint/1514

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