Integrate by parts twice: First: ( I_n = \frac1n \int_0^1 f'(t)\cos(nt) dt ) (boundary term vanishes because ( f(0)=f(1)=0 )). Second: Let ( K_n = \int_0^1 f'(t)\cos(nt) dt ). Integrate by parts: ( u = f'(t) ), ( dv = \cos(nt) dt ), ( du = f''(t) dt ), ( v = \sin(nt)/n ). Then [ K_n = \left[ f'(t) \frac\sin(nt)n \right]_0^1 - \frac1n \int_0^1 f''(t) \sin(nt) dt. ] Boundary term: at ( t=1 ), ( f'(1)\sin n /n = O(1/n) ); at ( t=0 ), ( f'(0)\sin 0 / n = 0 ). So ( K_n = O(1/n) ). Then [ I_n = \frac1n \cdot O\left(\frac1n\right) = O\left(\frac1n^2\right). ] With ( f'' ) integrable, the remaining integral ( \int f''(t)\sin(nt) dt \to 0 ) by Riemann–Lebesgue, giving ( o(1/n^2) ).
Thus [ I_n = -\frac\cos nn + \frac\sin nn^2. ] As ( n \to \infty ), ( I_n = -\frac\cos nn + o\left(\frac1n\right) ). The amplitude of ( I_n ) is ( \sim \frac1n ) up to a bounded oscillatory factor. Indeed ( |I_n| \sim \fracn ), not ( C/n ) with constant sign, but in the sense of equivalence modulo ( o(1/n) ), it's ( O(1/n) ) and not ( o(1/n) ). Oraux X Ens Analyse 4 24.djvu
[ I_n = \left[ -f(t) \frac\cos(nt)n \right]_0^1 + \frac1n \int_0^1 f'(t) \cos(nt) , dt. ] Boundary term: at ( t=1 ): ( -f(1) \frac\cos nn ). At ( t=0 ): ( + f(0) \frac1n = 0 ). So boundary term is ( O(1/n) ). Integrate by parts twice: First: ( I_n =
Actually, known result: If ( f ) is ( C^1 ) and ( f(0)=0 ), ( I_n = o(1/n) ). If ( f ) is ( C^2 ) and ( f(0)=f(1)=0 ), then ( I_n = O(1/n^2) ). But here they only give ( f'(0)=0 ), not ( f(1)=0 ). Possibly a misprint? Let's assume they intended ( f(0)=f(1)=0 ) for (3). Then: Then [ K_n = \left[ f'(t) \frac\sin(nt)n \right]_0^1