Index of norms and absolute values

This index is for:

expressions

Norms

Expression		Index	Context	Details
$\\|\cdot\\|$	$\\|v\\|$		Functional Analysis Real Analysis	Denotes the Norm of a vector
$\\|\cdot\\|_{C^k}$	$\\|f\\|_{C^k}$	CK	Functional Analysis	This Norm is defined by $\\|f\\|_{C^k}=\sum^k_{i=0}\sup_{t\in[0,1]}(\|f^{(i)}(t)\|)$ - note $f^{(i)}$ is the $i^\text{th}$ derivative.
$\\|\cdot\\|_\infty$	$\\|f\\|_\infty$	INFINITY	Functional Analysis Real Analysis	It is a norm on $C([a,b],\mathbb{R})$ , given by $\\|f\\|_\infty=\sup_{x\in[a,b]}(\|f(x)\|)$
$\\|\cdot\\|_{L^p}$	$\\|f\\|_{L^p}$	LP	Functional Analysis	$\\|f\\|_{L^p}=\left(\int^1_0\|f(t)\|^pdt\right)^\frac{1}{p}$ - it is a Norm on $\mathcal{C}([0,1],\mathbb{R})$

Expression		Index	Context	Details
$\|\cdot\|$	$\|x\|$		Real analysis Abstract algebra	The traditional Absolute value