When x\in [0,1] , (1-2x)^{2n}\le 1 and e^x\le e , by first mean value theorem for definite integrals , \begin{align*} I_n&\le\max_{x\in[0,1]}\{(1-2x)^{2n}e^x\}\int_0^1x^{2n}~\mathrm dx\\ ...

Without loss of generality, assume \|g\|=1 . Then \begin{align} 0 &=\delta\int_0^1g(x)^2\,\mathrm{d}x\\ &=2\int_0^1g(x)\,\delta g(x)\,\mathrm{d}x\tag1 \end{align} For each \delta g(x) ...

\begin{align*} e^{\psi(2n+1)} \int_{0}^{1} x^{n} (1-x)^n dx &= \text{lcm}(1,2,...,2n+1) \int_{0}^{1} x^n \sum_{k=0}^{n}\binom{n}{k}(-1)^k x^k dx\\ &= \text{lcm}(1,2,...,2n+1) ...

Step1. For the stationary f, f(0)=0. Otherwise, we can re-define f on a right neighbourhood of zero and make the RHS strictly increase. Step2. Assuming x\in(0,1], take g(x)=\frac{f(x)}{x}. ...

The basic reason why one considers lower and upper Riemann sums is that it is allowed to take the \inf or \sup over any however structured set of real values, while taking a limit in the ordinary ...

D_N(t) = \sum_{k=-N}^Ne^{2\pi i k t} =e^{-2\pi i N t}\sum_{k=0}^{2N}e^{2\pi i k t}=e^{-2\pi i N t}\frac{e^{2\pi i (2N+1) t}-1}{e^{2\pi i t}-1}=\frac{\sin \big(\pi(2N + 1)t \big)}{\sin(\pi t)}.