Wick product: Difference between revisions

Template:Short description

In probability theory, the Wick product, named for Italian physicist Gian-Carlo Wick, is a particular way of defining an adjusted product of a set of random variables. In the lowest order product the adjustment corresponds to subtracting off the mean value, to leave a result whose mean is zero. For the higher-order products the adjustment involves subtracting off lower order (ordinary) products of the random variables, in a symmetric way, again leaving a result whose mean is zero. The Wick product is a polynomial function of the random variables, their expected values, and expected values of their products.

The definition of the Wick product immediately leads to the Wick power of a single random variable, and this allows analogues of other functions of random variables to be defined on the basis of replacing the ordinary powers in a power series expansion by the Wick powers. The Wick powers of commonly-seen random variables can be expressed in terms of special functions such as Bernoulli polynomials or Hermite polynomials.

Assume that Template:Math are random variables with finite moments. The Wick product

$${\displaystyle ⟨X_1,\dots ,X_k⟩}$$

is a sort of product defined recursively as follows:Template:Citation needed

$${\displaystyle ⟨⟩=1}$$

(i.e. the empty product—the product of no random variables at all—is 1). For Template:Math, we impose the requirement

$${\displaystyle \frac{\partial ⟨X_1,\dots ,X_k⟩}{\partial X_i}=⟨X_1,\dots ,X_{i-1},{\hat{X}}_i,X_{i+1},\dots ,X_k⟩,}$$

where ${\displaystyle {\hat{X}}_i}$ means that Template:Mvar is absent, together with the constraint that the average is zero,

$${\displaystyle \mathrm{E}[⟨X_1,\dots ,X_k⟩]=0.}$$

Equivalently, the Wick product can be defined by writing the monomial Template:Math as a "Wick polynomial":

$${\displaystyle X_1\dots X_k=\sum _{S\subseteq \{1,\dots ,k\}}\mathrm{E}\left[\prod _{i\notin S}{X}_i\right]\cdot ⟨X_i:i\in S⟩,}$$

where ${\displaystyle ⟨X_i:i\in S⟩}$ denotes the Wick product ${\displaystyle ⟨X_{i_1},\dots ,X_{i_m}⟩}$ if ${\displaystyle S=\{i_1,\dots ,i_m\}.}$ This is easily seen to satisfy the inductive definition.

It follows that

$${\displaystyle \begin{array}{cc}⟨X⟩=& X-\mathrm{E}[X],\\ ⟨X,Y⟩=& XY-\mathrm{E}[Y]\cdot X-\mathrm{E}[X]\cdot Y+2(\mathrm{E}[X])(\mathrm{E}[Y])-\mathrm{E}[XY],\\ ⟨X,Y,Z⟩=& XYZ\\ & -\mathrm{E}[Y]\cdot XZ\\ & -\mathrm{E}[Z]\cdot XY\\ & -\mathrm{E}[X]\cdot YZ\\ & +2(\mathrm{E}[Y])(\mathrm{E}[Z])\cdot X\\ & +2(\mathrm{E}[X])(\mathrm{E}[Z])\cdot Y\\ & +2(\mathrm{E}[X])(\mathrm{E}[Y])\cdot Z\\ & -\mathrm{E}[XZ]\cdot Y\\ & -\mathrm{E}[XY]\cdot Z\\ & -\mathrm{E}[YZ]\cdot X\\ & -\mathrm{E}[XYZ]\\ & +2\mathrm{E}[XY]\mathrm{E}[Z]\\ & +2\mathrm{E}[XZ]\mathrm{E}[Y]\\ & +2\mathrm{E}[YZ]\mathrm{E}[X]\\ & -6(\mathrm{E}[X])(\mathrm{E}[Y])(\mathrm{E}[Z]).\end{array}}$$

In the notation conventional among physicists, the Wick product is often denoted thus:

$${\displaystyle :X_1,\dots ,X_k:}$$

and the angle-bracket notation

$${\displaystyle ⟨X⟩}$$

is used to denote the expected value of the random variable Template:Mvar.

The Template:Mvarth Wick power of a random variable Template:Mvar is the Wick product

$${\displaystyle X{\text{'}}^n=⟨X,\dots ,X⟩}$$

with Template:Mvar factors.

The sequence of polynomials Template:Mvar such that

$${\displaystyle P_n(X)=⟨X,\dots ,X⟩=X{\text{'}}^n}$$

form an Appell sequence, i.e. they satisfy the identity

$${\displaystyle {P_n}^{\prime }(x)=n{P}_{n-1}(x),}$$

for Template:Math and Template:Math is a nonzero constant.

For example, it can be shown that if Template:Mvar is uniformly distributed on the interval Template:Math, then

$${\displaystyle X{\text{'}}^n=B_n(X)}$$

where Template:Mvar is the Template:Mvarth-degree Bernoulli polynomial. Similarly, if Template:Mvar is normally distributed with variance 1, then

$${\displaystyle X{\text{'}}^n=H_n(X)}$$

where Template:Mvar is the Template:Mvarth Hermite polynomial.

$${\displaystyle (aX+bY{)}^{\text{'}n}={\displaystyle \sum _{i=0}^n}(\genfrac{}{}{0ex}{}{n}{i})a^i{b}^{n-i}{X}^{\text{'}i}{Y}^{\text{'}n-i}}$$

$${\displaystyle ⟨\exp (aX)⟩\stackrel{\mathrm{d}\mathrm{e}\mathrm{f}}{=}{\displaystyle \sum _{i=0}^{\mathrm{\infty }}}\frac{a^i}{i!}{X}^{\text{'}i}}$$

Template:No footnotes

• Wick Product Springer Encyclopedia of Mathematics
• Florin Avram and Murad Taqqu, (1987) "Noncentral Limit Theorems and Appell Polynomials", Annals of Probability, volume 15, number 2, pages 767—775, 1987.
• Hida, T. and Ikeda, N. (1967) "Analysis on Hilbert space with reproducing kernel arising from multiple Wiener integral". Proc. Fifth Berkeley Sympos. Math. Statist. and Probability (Berkeley, Calif., 1965/66). Vol. II: Contributions to Probability Theory, Part 1 pp. 117–143 Univ. California Press
• Wick, G. C. (1950) "The evaluation of the collision matrix". Physical Rev. 80 (2), 268–272.