We assume that f(x)\ge M. Since f is decreasing then f(k)\ge f(x), for all x\in [k,k+1], and hence f(k)=f(k)\int_k^{k+1}1\,dx=\int_k^{k+1}f(k)\,dx\ge \int_{k}^{k+1} f(x)\,dx, and hence ...

Parameterize the curve as x=t, y=t^2. Then, dz=(1+i2t)dt and \int_C \bar z\,dz=\int_0^1(t-it^2)\,(1+i2t)dt=\int_0^1(t+2t^3)\,dt+i\int_0^1t^2\,dt=1+i\frac13

Actually, the first one is not a metric. Take f(x)=0 and g(x)=\begin{cases}1&\text{ if }x=0\\0&\text{ otherwise.}\end{cases} Then f\neq g , but d(f,g)=0 .

The functional is J[f]=\int_0^1 L(x,f(x),f'(x))\,dx=\int_0^1 xf(x)f'(x)\,dx The Euler-Lagrange equation for this functional, with L=xff' is given by \begin{align} \frac{\partial }{\partial f}L(x,f,f')-\frac{d}{dx}\frac{\partial}{\partial f'}L(x,f,f')&=\frac{\partial }{\partial f}(xff')-\frac{d}{dx}\frac{\partial}{\partial f'}(xff')\\\\ &=xf'-\frac{d}{dx}(xf)\\\\ &=-f \end{align} ...

This is not entirely correct. The series \sum_{k=0}^\infty (-1)^kx^{2k} converges to 1/(1+x^2) on (-1,1), but the convergence is not uniform. As a power series with convergence radius 1, it ...

In Srednicki, Ch. 9, it reads: This makes it easy to impose the normalization Z_1(0) = 1: we simply omit the vacuum diagrams (those with no sources), like those of figs. 9.1 and 9.2. We then have ...