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I'm trying to understand how to use the circle method to derive an asymptotic formula for Waring's Problem. Do so using the circle method developed by Hardy and Littlewood. In doing this, I want to make sure that:

given $P, Q$ natural numbers with $P > 1$ and $Q \ge 2P$, the following intervals don't overlap:

$\{ c: |c- (a/q)| \le 1/(pQ) \}$ where

  • $q \le P$
  • $1\le a \le q $
  • $(a,q) = 1$

Sorry, I can't seem to get Latex commands right. Any insight to this would be helpful, thanks!

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Here is an extended hint: let $I(a,q),I(a',q')$ be two such intervals, and suppose that $I(a,q)\cap I(a',q')\neq \varnothing.$ Use this to show that $\lvert aq'-a'q\rvert\le \dfrac{q+q'}{Q}.$ If we suppose that $q\neq q',$ then the left hand side cannot be zero (why?). On the other hand, in this case we can see that $q+q'<2P,$ which will show that the left hand side must be less than one, yielding a contradicion. So we must have $q=q'.$ This case follows by a similar method.

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    Dear @Zak, the first inequality follows by applying the triangle inequality to $|c-\frac{a}{q}|+|c-\frac{a'}{q'}|$ where $c\in I(a,q)\cap I(a',q').$ (I.e., assuming the intersection is nonempty.)2012-10-23