Why oscillation counts: Diophantine approximation, geometry, and the Fourier transform

오버불파크에서 찍은 현대수학의 면모

Why oscillation counts: Diophantine approximation, geometry, and the Fourier transform

Is it possible to approximate arbitrary points in space by vectors with rational coordinates, with which we, and computers, feel much more comfortable? If yes, can we approximate those points arbitrarily close? In this snapshot, we explore how the geometric configuration of these points influences the answers to these questions. Further, we delve into the closely related problem of counting rational vectors near surfaces. The unlikely tool which helps us in this endeavour is Fourier analysis – the study of waves and oscillations!

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수학적 주제

대수학/정수론

해석학

다른 분야와의 연관성

컴퓨터 과학

공학

물리학

저자

Rajula Srivastava

라이선스

CC BY-SA-4.0

디지털 객체 식별자(DOI)

10.14760/SNAP-2025-009-EN

PDF 다운로드

application/pdf

snapshot-2025-009.pdf

PDF

snapshots: overview

Rajula Srivastava

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Lagrangian mean curvature flow

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Molecular quantum dynamics

Closed geodesics on surfaces and Riemannian manifolds

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Profinite groups

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The adaptive finite element method

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Statistics and dynamical phenomena

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Arrangements of lines

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The ternary Goldbach Problem

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Matrixfaktorisierungen

John E. McCarthy

Dirichlet Series

수학적 주제

대수학/정수론

해석학

수학교육/교수법

이산수학/수학기초론

기하학/위상수학

수치해석/과학계산

확률론/통계학

다른 분야와의 연관성

화학 및 지구과학

컴퓨터 과학

공학

금융

인문/사회과학

생명 과학

물리학

수학 전반에 대한 소고

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