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WARING’S PROBLEM WITH SHIFTS

Part of: Diophantine equations Additive number theory; partitions Forms and linear algebraic groups

Published online by Cambridge University Press:  06 March 2015

Sam Chow
Sam Chow*
Affiliation:
School of Mathematics, University of Bristol, University Walk, Clifton, Bristol BS8 1TW, U.K. email Sam.Chow@bristol.ac.uk
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Abstract

Let ${\it\mu}_{1},\ldots ,{\it\mu}_{s}$ be real numbers, with ${\it\mu}_{1}$ irrational. We investigate sums of shifted $k$th powers $\mathfrak{F}(x_{1},\ldots ,x_{s})=(x_{1}-{\it\mu}_{1})^{k}+\cdots +(x_{s}-{\it\mu}_{s})^{k}$. For $k\geqslant 4$, we bound the number of variables needed to ensure that if ${\it\eta}$ is real and ${\it\tau}>0$ is sufficiently large then there exist integers $x_{1}>{\it\mu}_{1},\ldots ,x_{s}>{\it\mu}_{s}$ such that $|\mathfrak{F}(\mathbf{x})-{\it\tau}|<{\it\eta}$. This is a real analogue to Waring’s problem. When $s\geqslant 2k^{2}-2k+3$, we provide an asymptotic formula. We prove similar results for sums of general univariate degree-$k$ polynomials.

MSC classification

Primary: 11D75: Diophantine inequalities
Secondary: 11E76: Forms of degree higher than two 11P05: Waring's problem and variants
Type
Research Article
Information
Mathematika , Volume 62 , Issue 1 , 2016 , pp. 13 - 46
Copyright
Copyright © University College London 2015 

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