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Notation

We spend a tremendous amount of time on notation and conventions, to make them both intuitive for readers from different disciplines and consistent across a wide set of topics. In the short Section 1 here below we point out a few key tenets that appear throughout all the present work. For the full list of notations, keep reading further below.

Key notation tenets

Non-random quantities (scalars or vectors/matrices): lower case $x, y, α, β, μ, σ^{2}, \dots$
Random variables (scalars or vectors/matrices): upper case $X, Y, A, B, M, Σ^{2}, \dots$
Examples:
$X \sim N (μ, σ^{2})$ ;
$Σ^{2} \sim W i s h a r t (ν, σ^{2})$ ;
$x$ (realized random variable);
$β$ (coefficient).
Exception: $ϵ_{t}$ is realized invariant; $ε_{t}$ (not $E_{t}$ ) is invariant as random variable.

Dummy counters: $n = 1, \dots, ¯ n$ (similar for $i, j, k, l, t, \dots$ ).
We do not use upper case $n = 1, \dots, N$ , to avoid confusion with random variables (such as $N_{t}$ Poisson counter).
We do not use other letters $n = 1, \dots, j$ (except in special cases), to be more succinct and clear.
Examples:
$\sum_{n = 1}^{¯ n} x_{n}$ (sum);
for $i = 1, \dots, ¯ ı$ , $x_{i} \leftarrow y_{i}$ (pseudo-code).

Scalars (random or non-random): regular math font $x, X, α, β, \dots$
Vectors and matrices (random or non-random): bold math font $x, X, α, β, \dots$
Examples:
$X \equiv {(X_{1}, \dots, X_{¯ n})}_{1}^{'}$ (random vector);
$β \equiv {β_{n, k}}_{n, k}^{k = 1, \dots, ¯ k}$ (non-random matrix).

Symmetric, positive (semi)definite matrix: square bold math $s^{2}, σ^{2}, Σ^{2}, \dots$ , where $s, σ, Σ, \dots$ are the respective symmetric Riccati roots (27.386).
Examples:
$s^{2}$ is a generic symmetric and positive (semi)definite $¯ n \times ¯ n$ matrix;
$s_{v o l} \equiv s^{v o l} \equiv v o l (s^{2})$ denotes the “volatility” vector extracted from $s^{2}$ , i.e. $s_{v o l} \equiv \sqrt{d i a g (s^{2})}$ ;
$c^{2} \equiv c o r r (s^{2})$ denotes the “correlation” matrix extracted from $s^{2}$ , i.e. $c^{2} \equiv D i a g (1 . ∕ s_{v o l}) s^{2} D i a g (1 . ∕ s_{v o l})$ ;
$σ^{2}$ in $X \sim N (μ, σ^{2})$ (multivariate counterpart of univariate $X \sim N (μ, σ^{2})$ );
$Σ^{2} \sim W i s h a r t (ν, σ^{2})$ (matrix-variate counterpart of univariate $Σ^{2} \sim G a m m a (k, θ)$ ).

Date/point-in-time: Latin letter $t, s, u, \dots$
Period/time span: Greek letter $τ, υ, \dots$
Examples:
$t_{n o w} =$ 12/01/2014, 13h:07m:04s:472ms (current time);
$t_{h o r} =$ 12/02/2014, 00h:00m:00s:000ms (investment horizon);
$t_{s t a r t} =$ 01/07/2010, 00h:00m:00s:000ms (inception date/vintage);
$t_{e n d} =$ 01/07/2018, 00h:00m:00s:000ms (time of expiry/maturity date);
$τ = 3$ years (time to expiry/maturity);
$α =$ 2.4 years (age of a contract).

Value at time $t$ of one unit of an instrument: $V_{t}$ (in general value is not the same as price).
Examples:
$V_{t}^{s t o c k}$ is value ( $=$ price) of one share of stock;
$V_{t}^{b o n d}$ is value ( $=$ dirty price, $\neq$ price) of a one-dollar notional coupon bond;
$V_{t}^{z c b}$ is value ( $=$ price) of a one-dollar notional zero-coupon bond;
$V_{t}^{f w d}$ is value ( $\neq$ price) of one forward contract;
$V_{t}^{f u t u r e s}$ is value ( $\neq$ price) of one futures contract;
$V_{t}^{i n d e x}$ is value ( $=$ price) of one index (e.g. the S&P 500 index);
$V_{t}^{c a l l}$ is value ( $=$ price) of one call option.
Exception: in market microstructure we use prices $P_{t}$ , because they are more common and equivalent (19.64).

Short form for a process sampled at discrete times (time series) $x . = {. . ., x_{t_{i}}, x_{t_{i + 1}}, x_{t_{i + 2}}, . . .}$ .
Example:
$x . = {\dots, x_{t - 1}, x_{t}, x_{t + 1,} \dots}$ is a time series of values sampled at unit steps.

Time interval for flow variables [W]: $t \to u$
Examples:
$R_{t \to u}$ (return from $t$ to $u$ );
$Π_{t \to u} \equiv {(Π_{1, t \to u}, \dots, Π_{¯ n, t \to u})}_{1, t \to u}^{'}$ (P&L of $¯ n$ instruments from $t$ to $u$ ).

Time interval for processes with multiple monitoring times: $t ⇝ u$
Examples:
$X_{t ⇝ u} \equiv (X_{t} | X_{t + 1} | \dots, X_{u - 1} | X_{u})$ (univariate stochastic path from $t$ to $u$ , with equal-lag sampling);
$x_{t ⇝ u} \equiv (x_{t} | x_{t + 1} | \dots | x_{u - 1} | x_{u})$ (multivariate path from $t$ to $u$ , with equal-lag sampling).

Time: throughout the present work, time $t$ is a continuum, or
$t \in R .$ (2)
- On a microscopic scale, such as in market microstructure, events (such as trades) occur at discrete and randomly spaced points $T_{k}$ in the time continuum, or $T_{k} \in R$ . Then a value ${˜ X}_{k}$ (such as a trading price) occurring at time $T_{k}$ is the mark associated with the point $T_{k}$ in a marked point process.
- On a macroscopic scale, such as in dynamic strategies, trading within or across instruments can occur at any point in time $t \in R$ . On this scale we have continuous-time stochastic processes ${X_{t}}_{t \in R}$ , which are assumed right continuous with left limits (cadlag [W]). We slice time using the half close-half open interval convention $[t, u)$ . Under this setup the last value of a process in $[t, u)$ (such as the closing price over a day) is defined as the left limit.
- For estimation purposes, we sample continuous time processes ${X_{t}}_{t \in R}$ over a discrete time grid ${X_{t_{k}}}_{k \in N}$ . The grid is typically equally spaced, or $t_{0}, t_{1} = t_{0} + Δ, t_{2} = t_{0} + 2 Δ, \dots$ , although it need not be. If the grid is equally spaced, we may shift and rescale, for ease of notation and without loss of generality, the grid to $t_{0} = 0, t_{1} = 1, t_{2} = 2, \dots$ . Regardless, we consider these ${t_{k}}_{k \in N}$ as instances of a continuum $t \in R$ .
- For valuation (or “pricing”) purposes, we focus on two discrete points in time: the current valuation time $t_{n o w}$ and the payoff horizon $t_{h o r}$ . If we are pricing a rebalancing strategy, such as an option-replicating strategy, trading and rebalancing is assumed to occur at any point in time $t \in [t_{n o w}, t_{h o r}]$ , although we only focus on the two snapshots $t_{n o w}$ and $t_{h o r}$ .

Operators and special functions

$1_{P} \equiv {\begin{matrix} 1 & if P is true 0 & if P is false \end{matrix}$	Iverson brackets [W]
$1_{x \in A}$	indicator function of a set $A$ [W], notation consistent with Iverson brackets
$δ^{(y)}, δ^{(y)} (x)$	Dirac delta function (point mass) concentrated at $y$ [W]
$δ_{¯ n \times 1}^{(n)}, δ^{(n)}$	canonical basis
	$δ_{¯ n \times 1}^{(n)} \equiv ⎛ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎝ \begin{matrix} 0 \cdot 1 & \leftarrow n -th position \cdot 0 \end{matrix} ⎞ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎠$
$F [v] (x)$	Fourier transform (Table 29.3)
$F^{- 1} [v] (x)$	inverse Fourier transform (Table 29.3)
$I^{q} [f] (x)$	integration operator applied $q$ times (36.20)
$c_{η}^{- 1} (y)$	inverse-call transformation with parameter $η$ (E.1.29)
${(s)}^{+} \equiv max (0, s)$	positive part function
$erf (x)$	error function [W]
${erf}^{- 1} (x)$	inverse error function [W]
$Δ X_{t} \equiv X_{t} - X_{t - 1}$	change (difference, increment)
$L^{p} X_{t} \equiv X_{t - p}$	lag operator of order $p$
$e w m a_{w}^{τ_{H L}} (t, x .)$	exponentially weighted moving average at time $t$ with half-life $τ_{H L}$ and trailing window of size $w$
$d i a g (x)$	operator that extracts the main diagonal of an $¯ n \times ¯ n$ matrix $x$ , i.e.
	$d i a g (x) \equiv ⎛ ⎜ ⎜ ⎝ \begin{matrix} x_{1, 1} ⋮ x_{¯ n, ¯ n} \end{matrix} ⎞ ⎟ ⎟ ⎠$
$D i a g (x)$	operator that maps an $¯ n \times 1$ vector $x$ into an $¯ n \times ¯ n$ matrix which has $x$ on the main diagonal and null entries elsewhere, i.e.
	$D i a g (x) \equiv ⎛ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎝ \begin{matrix} x_{1} & 0 & \dots & 0 0 & x_{2} & \dots & 0 \cdot & \cdot & ⋱ & \cdot 0 & 0 & \dots & x_{¯ n} \end{matrix} ⎞ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎠$
$\| x \|$	absolute value of the scalar $x$

$det (x)$	determinant of the $¯ n \times ¯ n$ square matrix $x$
$c a r d (S)$	cardinality of the set $S$
$⌊ x ⌋$	floor function [W]
$⌈ x ⌉$	ceiling function [W]
$tr (x)$	trace of the $¯ n \times ¯ n$ square matrix $x$ , i.e. $tr (x) \equiv x_{1, 1} + \dots + x_{¯ n, ¯ n}$
$v e c (x)$	operator that maps an arbitrary $¯ n \times ¯ k$ matrix $x$ into a $¯ n ¯ k \times 1$ vector, stacking the columns of $x$ , i.e.
	$v e c (x) = ⎛ ⎜ ⎜ ⎜ ⎜ ⎝ \begin{matrix} x_{\cdot, 1} x_{\cdot, 2} \cdot x_{\cdot, ¯ k} \end{matrix} ⎞ ⎟ ⎟ ⎟ ⎟ ⎠$
$x^{†}$	pseudo-inverse (27.411) of the matrix $x$
$x^{*}$	conjugate transpose of the complex-valued matrix $x$
$∥ \cdot ∥$	Euclidean (vector) norm
$∥ \cdot ∥_{F}$	Frobenius (matrix) norm
$. ∕$	element-wise division (if one operand is a scalar and the other is not, the scalar expands into an array of the same size as the other operand)
$\circ$	Hadamard product [W]
$\otimes$	Kronecker product [W]
$\oplus$	Kronecker sum [W]
$K_{¯ k, ¯ n}$	$¯ k ¯ n \times ¯ k ¯ n$ commutation matrix (27.419)
$[f * g] (x)$	convolution (29.71)
${[a * b]}_{t}$	discrete convolution (29.72)
$s o r t_{x}$	sorting function which allows to obtain from a generic set ${x_{i}}_{i \in I}$ the set of sorted elements ${x_{i}^{s o r t}}_{i \in I}$ , where $x_{i}^{s o r t} \equiv x_{s o r t_{x} (i)}$ and $i \mapsto s o r t_{x} (i)$ is a permutation of the indexes $i \in I$ such that $x_{1}^{s o r t} \leq \dots \leq x_{i}^{s o r t} \leq \dots$
$\propto$	directly proportional to [W]

Sets

$\partial E_{r} (m, σ^{2}) \equiv {x \in R^{¯ n} : {(x - m)}^{'} {(σ^{2})}^{- 1} (x - m) = r^{2}}$	ellipsoid with center $m$ , shape $σ^{2}$ and radius $r$ (when $r = 1$ the subscript is dropped)
$\partial B^{¯ n} \equiv \partial E (0, I_{¯ n})$	$¯ n$ -dimensional unit sphere
$E_{r} (m, σ^{2}) \equiv {x \in R^{¯ n} : {(x - m)}^{'} {(σ^{2})}^{- 1} (x - m) \leq r}$	filled ellipsoid with center $m$ , shape $σ^{2}$ and radius $r$ (when $r = 1$ the subscript is dropped)
$B^{¯ n} \equiv E (0, I_{¯ n})$	$¯ n$ -dimensional filled unit ball
$S^{¯ n - 1} \equiv {x \in R^{¯ n} : \sum_{n = 1}^{¯ n} x_{n} = 1 and x_{n} \geq 0 for all n}$	unit simplex in $R^{¯ n}$
${[0, 1]}^{¯ n} \equiv [0, 1] \times \dots \times [0, 1]      ¯ n times$	$¯ n$ -dimensional unit hypercube

Calculus

$g (x) = {(g_{1} (x), \dots, g_{¯ ¯ ¯ m} (x))}_{1}^{'}$	multivariate function
$\nabla_{x} g \equiv (\nabla_{x} g_{1} \| \dots \| \nabla_{x} g_{¯ ¯ ¯ m})$	gradient
$\nabla_{x, x}^{2} g \equiv (\nabla_{x, x}^{2} g_{1} \| \dots \| \nabla_{x, x}^{2} g_{¯ ¯ ¯ m})$	Hessian
${[j_{g}]}_{m, n} \equiv \frac{\partial g_{m}}{\partial x_{n}}$	Jacobian

See Chapter 28.1.3 for details.

Probability and general distribution theory

$P$	real world probability
$Q$	risk neutral probability
$f_{X}$	probability density function (pdf) of $X$
$F_{X}$	cumulative distribution function (cdf) of $X$
$φ_{X}$	characteristic function of $X$
$X d = Y$	equality in distribution (i.e. $f_{X} = f_{Y}$ )
$f_{X \| z} (x)$ (or $f (x \| z)$ )	conditional pdf of $X \| z$
$ϕ$	univariate standard normal pdf
$Φ$	univariate standard normal cdf
$ϕ_{ϱ^{2}}^{2}$	multivariate standard normal pdf (correlation matrix: $ϱ^{2}$ )
$Φ_{ϱ^{2}}^{2}$	multivariate standard normal cdf (correlation matrix: $ϱ^{2}$ )
$Φ_{ν}$	univariate standard Student t cdf (degrees of freedom: $ν$ )
$f_{μ, σ^{2}}^{2} (x)$	pdf of an elliptical random variable $X \sim E l (μ, σ^{2}, g_{¯ n})$ , including normal ( $f_{μ, σ^{2}}^{N} (x)$ ), Student $t$ ( $f_{μ, σ^{2}, ν}^{t} (x)$ ) and Cauchy ( $f_{μ, σ^{2}}^{C a u c h y} (x)$ )
$φ_{μ, σ^{2}}^{2} (ω)$	characteristic function of an elliptical random variable $X \sim E l (μ, σ^{2}, g_{¯ n})$ , including normal ( $φ_{μ, σ^{2}}^{N} (x)$ ), Student $t$ ( $φ_{μ, σ^{2}, ν}^{t} (x)$ ) and Cauchy ( $φ_{μ, σ^{2}}^{C a u c h y} (x)$ )
$I_{t}$	information (generator)
$f_{Θ}^{p r i}$	prior distribution (pdf)
$f_{Θ}^{p o s}$	posterior distribution (pdf)
$C o p_{X} \Leftrightarrow f_{U}$	copula of $X$ represented by the pdf of the grades $U$
$θ$	vector of parameters

Summary statistical features

$S {X}$	generic statistical feature of $X$
$L o c {X}$	location feature of $X$
$D i s p {X}$	dispersion feature of $X$
$E {X}$	expectation vector, each entry is the expectation of the respective entry in $X$
$E_{t} {X}$ or $E {X \| i_{t}}$	expectation vector conditioned on the information $i_{t}$
$V {X}$	variance vector, each entry is the variance of the respective entry in $X$
$S d {X}$	standard deviation vector, each entry is the standard deviation of the respective entry in $X$
$C v {X, Y}$	covariance matrix ( $C v {X} \equiv C v {X, X}$ )
	$C v {X, Y} \equiv ⎛ ⎜ ⎜ ⎜ ⎜ ⎜ ⎝ \begin{matrix} C v {X_{1}, Y_{1}} & C v {X_{1}, Y_{2}} & \dots \cdot & C v {X_{2}, Y_{2}} & C v {X_{2}, Y_{3}} & \dots \cdot & ⋱ \end{matrix} ⎞ ⎟ ⎟ ⎟ ⎟ ⎟ ⎠$
$C r {X, Y}$	correlation matrix ( $C r {X} \equiv C r {X, X} = D i a g (1 . ∕ S d {X}) C v {X} D i a g (1 . ∕ S d {X})$ )
	$C r {X, Y} \equiv ⎛ ⎜ ⎜ ⎜ ⎜ ⎜ ⎝ \begin{matrix} C r {X_{1}, Y_{1}} & C r {X_{1}, Y_{2}} & \dots \cdot & C r {X_{2}, Y_{2}} & C r {X_{2}, Y_{3}} & \dots \cdot & ⋱ \end{matrix}$