JIPAM

An Application of Van der Corput's Inequality  
 
  Authors: Kanthi Perera,  
  Keywords: Van der Corput's inequality, Hardy and Littlewood  
  Date Received: 13/07/00  
  Date Accepted: 31/10/00  
  Subject Codes:

42A05

 
  Editors: A. M. Fink,  
 
  Abstract:

In this note we give a short and elegant proof of the result $ sum_{t=1}^n e^{imath(omega t+lpha t^2)} = o(n) $ for $ lpha$ not a rational multiple of $ pi$, uniformly in $ omega$. This was first proved by Hardy and Littlewood, in 1938. The main ingredient of our proof is Van der Corput's inequality. We then generalize this to obtain $ sum_{t=1}^n t^{eta} e^{imath(omega t+lpha t^{2})} = o(n^{eta+1}) $, where $ eta$ is a nonnegative constant.;



This article was printed from JIPAM
http://jipam.vu.edu.au

The URL for this article is:
http://jipam.vu.edu.au/article.php?sid=124