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I was asked to prove that

$\lim_{n\to\infty} \int_{0}^{1} \exp(i\cdot n\cdot p(x))\;dx =0 $

for nonconstant real polynomial $p(x)$.

if $p(x)$ is of degree $1$... It reduces to Riemann-Lebesgue lemma.

I think similar motivation will work... but not able to

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    we $n$eed a limit n goes to infinity.2012-10-02

1 Answers 1

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Suppose first that $p'$ is nonzero on $(0,1)$, so that $p$ has an inverse $q$ on $[0,1]$ which is differentiable everywhere except possibly at the endpoints. Then making the substitution $u=p(x)$ yields $\int_0^1 e^{i \, n \, p(x)} \, dx=\int_{p(0)}^{p(1)} e^{i \, n \, u} \, q'(u) \, du \, .$ Since $q'$ is the derivative of a bounded function, it is integrable. So the ordinary Riemann-Lebesgue lemma applies.

In general, $p'$ may not be nonzero on the entire interval. But since $p$ is a polynomial, we can split $[0,1]$ up into some finite collection of intervals over which $p'$ is nonzero, and make the above substitution separately on each of them...

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    I never thought change of variable will work.. Thank you!2012-10-03