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Autore principale: Bazlov, Naomi
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2410.07184
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author Bazlov, Naomi
author_facet Bazlov, Naomi
contents A representation number is a function which expresses the number of ways an integer can be written as a sum of elements of chosen sets. One of the oldest number-theoretic results on representation numbers is Fermat's theorem which says that an odd prime can be written as a sum of two squares in exactly $0$ or $2$ ways (if order of summands is important). In this dissertation, we discuss a selection of methods from modern analytic number theory and apply them to study asymptotics of certain representation numbers. In particular, we work through an argument in the recent paper "The multiplication table constant and sums of two squares" by Granville, Sabuncu and Sedunova to obtain upper bounds on higher moments of the number of ways of writing $n$ as the sum of a square and a square of a prime. We then use the method from the paper to obtain new results on moments of representation numbers where ``prime'' is replaced by ``sum of two squares''.
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publishDate 2024
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spellingShingle Moments of Representation Numbers
Bazlov, Naomi
Number Theory
A representation number is a function which expresses the number of ways an integer can be written as a sum of elements of chosen sets. One of the oldest number-theoretic results on representation numbers is Fermat's theorem which says that an odd prime can be written as a sum of two squares in exactly $0$ or $2$ ways (if order of summands is important). In this dissertation, we discuss a selection of methods from modern analytic number theory and apply them to study asymptotics of certain representation numbers. In particular, we work through an argument in the recent paper "The multiplication table constant and sums of two squares" by Granville, Sabuncu and Sedunova to obtain upper bounds on higher moments of the number of ways of writing $n$ as the sum of a square and a square of a prime. We then use the method from the paper to obtain new results on moments of representation numbers where ``prime'' is replaced by ``sum of two squares''.
title Moments of Representation Numbers
topic Number Theory
url https://arxiv.org/abs/2410.07184