Index of notation

Ordered symbols are notations which are (likely) to appear as they are given here, for example denotes the continuous function on the interval $[a,b]$ that map to $\mathbb{R}$ - this is unlikely to be given any other way because "C" is for continuous.

Ordered symbols

These are ordered by symbols, and then by LaTeX names secondly, for example $A$ comes before $\mathbb{A}$ comes before $\mathcal{A}$

Expression	Context	Details
$\\|\cdot\\|$	Functional Analysis Real Analysis	Denotes the Norm of a vector
$\\|f\\|_{C^k}$	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.
$\\|f\\|_{L^p}$	Functional Analysis	$\\|f\\|_{L^p}=\left(\int^1_0\|f(t)\|^pdt\right)^\frac{1}{p}$ - it is a Norm on $\mathcal{C}([0,1],\mathbb{R})$
$C([a,b],\mathbb{R})$	Functional Analysis Real Analysis	It is the set of all functions $:[a,b]\rightarrow\mathbb{R}$ that are continuous
$C^k([a,b],\mathbb{R})$	Functional Analysis Real Analysis	It is the set of all functions $:[a,b]\rightarrow\mathbb{R}$ that are continuous and have continuous derivatives up to (and including) order $k$ The unit interval will be assumed when missing
$\ell^p(\mathbb{F})$	Functional Analysis	The set of all bounded sequences, that is $\ell^p(\mathbb{F})=\{(x_1,x_2,...)\|x_i\in\mathbb{F},\ \sum^\infty_{i=1}\|x_i\|^p<\infty\}$
$\mathcal{L}^p$	Measure Theory	$\mathcal{L}^p(\mu)=\{u:X\rightarrow\mathbb{R}\|u\in\mathcal{M},\ \int\|u\|^pd\mu<\infty\},\ p\in[1,\infty)\subset\mathbb{R}$ $(X,\mathcal{A},\mu)$ is a measure space. The class of all measurable functions for which $\|f\|^p$ is integrable
$L^p$	Measure Theory	Same as $\mathcal{L}^p$

Unordered symbols

Expression	Context	Details
$\mathcal{A}/\mathcal{B}$ -measurable	Measure Theory	There exists a Measurable map between the $\sigma$ -algebras

Index of notation

Ordered symbols

Unordered symbols

Navigation menu

Views

Personal tools

Navigation

Search

Tools