Difference between revisions of "Wick product"
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The case of "pairings" which occured above corresponds to a graph on $\{ I_\nu \}$ where each vertex has precisely one leg. In terms of these Feynman diagrams a product of Wick monomials is expressed as a linear combination of Wick monomials as follows. | The case of "pairings" which occured above corresponds to a graph on $\{ I_\nu \}$ where each vertex has precisely one leg. In terms of these Feynman diagrams a product of Wick monomials is expressed as a linear combination of Wick monomials as follows. | ||
− | Let | + | Let $ I _ \nu $, |
+ | $ \nu = 1 \dots n $, | ||
+ | be a collection of disjoint finite sets, $ I = \cup _ \nu I _ \nu $, | ||
+ | and $ f _{i} $ | ||
+ | a collection of jointly Gaussian random variables indexed by $ I $. | ||
+ | Then | ||
+ | |||
+ | $$ \tag{a6} | ||
+ | \prod _ \nu : \prod _ {i \in I _ \nu} f _{i} :\ = \ | ||
+ | \sum _{G} \prod _ {e \in G} < f _{ {e _ 1}} f _{ {e _ 2}} > : \prod _ {i \notin [G]} f _{i} : , | ||
+ | $$ | ||
− | |||
− | where | + | where $ G $ |
+ | runs over all graphs on $ \{ I _ \nu \} $ | ||
+ | and $ [G] $ | ||
+ | is the union of all the disjoint unordered pairs making up $ G $. | ||
+ | More general Feynman graphs, such as graphs with also self-interaction lines, occur when several different covariances are involved, cf. [[#References|[a4]]]. | ||
For the expection of a product of Wick monomials one has | For the expection of a product of Wick monomials one has | ||
− | + | $$ \tag{a7} | |
+ | \left \langle \prod _ \nu : \prod _ {i \in I _ \nu} f _{i} : \right \rangle \ = \ | ||
+ | \sum _ {G \in \Gamma _{0} ( \{ I _ \nu \} )} \ | ||
+ | \prod _ {e \in G} \langle f _{ {e _ 1}} f _{ {e _ 2}} \rangle | ||
+ | $$ | ||
+ | |||
and, in particular, | and, in particular, | ||
− | + | $$ \tag{a8} | |
+ | \langle f _{1} \dots f _{n} \rangle \ = \ \left \{ | ||
+ | |||
+ | \begin{array}{ll} | ||
+ | 0 &\textrm{ if } \ n \ \textrm{ is } \ \textrm{ odd } , \\ | ||
+ | \sum _ {G \in \Gamma _{0} (n)} \ | ||
+ | \prod _ {e \in G} \langle f _{ {e _ 1}} f _{ {e _ 2}} \rangle &\ \textrm{ if } \ | ||
+ | n=2k , \\ | ||
+ | \end{array} | ||
+ | |||
+ | \right .$$ | ||
+ | |||
+ | |||
+ | where $ \Gamma _{0} (2k) $ | ||
+ | runs over all $ (2k)! 2 ^{-k} (k!) ^{-1} $ | ||
+ | ways of splitting up $ \{ 1 \dots 2k \} $ | ||
+ | into $ k $ | ||
+ | unordered pairs. All of the formulas (a1)–(a4), (a7), (a8), especially (a8), generally go by the name Wick's formula or Wick's theorem. | ||
+ | |||
+ | In the setting of (Euclidean) quantum field theory, let $ {\mathcal S} ( \mathbf R ^{n} ) $ | ||
+ | be the Schwartz space of rapidly-decreasing smooth functions and let $ {\mathcal S} ^ \prime ( \mathbf R ^{n} ) $ | ||
+ | be the space of real-valued tempered distributions. For $ f \in {\mathcal S} ( \mathbf R ^{n} ) $, | ||
+ | let $ \phi (f \ ) $ | ||
+ | be the linear function on $ {\mathcal S} ^ \prime ( \mathbf R ^{n} ) $ | ||
+ | given by $ \phi (f \ )(u) = u(f \ ) $. | ||
+ | Then for any continuous positive scalar product $ C $ | ||
+ | on $ {\mathcal S} ( \mathbf R ^{n} ) \times {\mathcal S} ( \mathbf R ^{n} ) $, | ||
+ | $ (f,\ g) \mapsto \langle f,\ Cg\rangle $, | ||
+ | there is a unique countably-additive Gaussian measure $ d q _{C} $ | ||
+ | on $ {\mathcal S} ^ \prime ( \mathbf R ^{n} ) $ | ||
+ | such that | ||
+ | |||
+ | $$ | ||
+ | \int\limits e ^ {\ i \phi (f \ )} \ dq _{C} \ = \ | ||
+ | \mathop{\rm exp}\nolimits \left ( - | ||
+ | \frac{1}{2} | ||
+ | \langle f ,\ C f \ \rangle \right ) ,\ \ | ||
+ | f \in {\mathcal S} ( \mathbf R ^{n} ) . | ||
+ | $$ | ||
+ | |||
− | + | Then $ \phi (f \ ) \in L _{p} ( {\mathcal S} ^ \prime ( \mathbf R ^{n} ) ,\ d q _{C} ) $ | |
+ | for all $ p \in [1,\ \infty ) $ | ||
+ | and | ||
− | + | $$ | |
+ | \int\limits \phi (f \ ) \ dq _{C} \ = \ 0 , | ||
+ | $$ | ||
− | |||
− | + | $$ | |
+ | \int\limits \phi (f _{1} ) \phi (f _{2} ) \ d q _{C} \ = \ \langle f _{1} ,\ Cf _{2} \rangle . | ||
+ | $$ | ||
− | |||
− | + | So $ \langle \phi (f _{1} ) \phi (f _{2} ) \rangle = \langle f _{1} ,\ Cf _{2} \rangle $, | |
+ | and some of the formulas of Wick monomials, etc., now take the form | ||
− | + | $$ \tag{a3\prime} | |
+ | : \phi (f \ ) ^{n} :\ = | ||
+ | $$ | ||
− | |||
− | + | $$ | |
+ | = \ | ||
+ | \sum _{j} | ||
+ | \frac{n!}{(n-2j)! j! 2 ^ j} | ||
+ | (-1) | ||
+ | ^{j} \langle f,\ Cf \ \rangle ^{j} \phi (f \ ) ^{n-2j\ } = | ||
+ | $$ | ||
− | |||
− | + | $$ | |
+ | = \ | ||
+ | \langle f,\ Cf \ \rangle ^{n/2} h _{n} \left ( | ||
+ | \frac{\phi (f \ )}{\langle f,\ Cf \ \rangle ^ 1/2} | ||
+ | \right ) , | ||
+ | $$ | ||
+ | |||
+ | |||
+ | $$ \tag{a5\prime} | ||
+ | : \prod _ {\nu =1} ^ n \phi (f _ \nu ) : \ = \ \sum | ||
+ | _{G} \prod _ {e \in G} < f _{ {e _ 1}} ,\ - Cf | ||
+ | _{ {e _ 2}} > \prod _ {i \notin [G]} \phi (f _{i} ) . | ||
+ | $$ | ||
+ | |||
Wick monomials have much to do with the [[Fock space|Fock space]] via the Itô–Wick–Segal isomorphism. This rest on either of two narrowly related uniqueness theorems: the uniqueness of standard Gaussian functions or the uniqueness of Fock representations. | Wick monomials have much to do with the [[Fock space|Fock space]] via the Itô–Wick–Segal isomorphism. This rest on either of two narrowly related uniqueness theorems: the uniqueness of standard Gaussian functions or the uniqueness of Fock representations. | ||
− | Let | + | Let $ {\mathcal S} $ |
+ | be a pre-Hilbert space. A representation of the canonical commutation relations over $ {\mathcal S} $ | ||
+ | is a pair of linear mappings | ||
+ | |||
+ | $$ | ||
+ | f \ \mapsto \ a(f \ ) ,\ \ g \ \mapsto \ a ^{*} (g) | ||
+ | $$ | ||
+ | |||
+ | |||
+ | from $ {\mathcal S} $ | ||
+ | to operators $ a(f \ ) $, | ||
+ | $ a ^{*} (g) $ | ||
+ | defined on a dense domain $ D $ | ||
+ | in a complex Hilbert space $ H $ | ||
+ | such that | ||
+ | |||
+ | $$ | ||
+ | a(f \ ) D \ \subset \ D ,\ \ a ^{*} (g) D \ \subset \ D , | ||
+ | $$ | ||
+ | |||
+ | |||
+ | $$ | ||
+ | \langle x _{1} ,\ a (f \ )x _{2} \rangle \ = \ \langle a ^{*} (f \ )x _{1} ,\ x _{2} \rangle , | ||
+ | $$ | ||
+ | |||
+ | |||
+ | $$ | ||
+ | [a(f \ ),\ a(g)] \ = \ [a ^{*} (f \ ),\ a ^{*} (g)] \ = \ 0, | ||
+ | $$ | ||
+ | |||
+ | |||
+ | $$ | ||
+ | [a(f \ ),\ a ^{*} (g)] x \ = \ \langle f,\ g\rangle x , | ||
+ | $$ | ||
+ | |||
− | + | for all $ x,\ x _{1} ,\ x _{2} \in D $, | |
+ | $ f ,\ g \in {\mathcal S} $. | ||
+ | The representation is called a Fock representation if there is moreover an $ \Omega \in D $, | ||
+ | called the vacuum vector, such that | ||
− | + | $$ | |
+ | a(f \ ) \Omega \ = \ 0 ,\ \ f \in {\mathcal S} , | ||
+ | $$ | ||
− | |||
− | + | and such that $ D $ | |
+ | is the linear space span of the vectors $ a ^{*} (g _{1} ) \dots a ^{*} (g _{k} ) \Omega $, | ||
+ | $ g _{i} \in {\mathcal S} $, | ||
+ | $ k = 0,\ 1,\dots $. | ||
+ | There is an existence theorem (cf. [[Fock space|Fock space]] and [[Commutation and anti-commutation relationships, representation of|Commutation and anti-commutation relationships, representation of]]) and the uniqueness theorem: If $ (a _{i} ,\ a _{i} ^{*} ) $ | ||
+ | are two Fock representations over $ {\mathcal S} $ | ||
+ | with vacuum vectors $ \Omega _{i} $, | ||
+ | then they are unitarily equivalent and the unitary equivalence $ U $ | ||
+ | is uniquely determined by $ U \Omega _{1} = \Omega _{2} $. | ||
− | |||
− | + | A standard Gaussian function on a real Hilbert space $ V $( | |
+ | called a Gaussian random process indexed by $ V $ | ||
+ | in [[#References|[a3]]]) is a mapping $ \phi $ | ||
+ | from $ V $ | ||
+ | to the random variables on a probability space $ (X ,\ {\mathcal B} ,\ \mu ) $ | ||
+ | such that (almost everywhere) | ||
− | + | $$ | |
+ | \phi (v+w) \ = \ \phi (v)+ \phi (w) ,\ \ v,\ w \in V , | ||
+ | $$ | ||
− | |||
− | + | $$ | |
+ | \phi ( \alpha v ) \ = \ \alpha \phi ( v) ,\ \ \alpha \in \mathbf R ,\ \ v \in V , | ||
+ | $$ | ||
− | |||
− | + | such that the $ \sigma $- | |
+ | algebra generated by the $ \phi (f \ ) $ | ||
+ | is $ {\mathcal B} $( | ||
+ | up to the sets of measure zero) and such that | ||
− | + | $ \phi (v) $ | |
+ | is a Gaussian random variable of mean zero, and | ||
− | + | $ \langle \phi (v) \phi (w)\rangle = \langle v,\ w\rangle $. | |
− | |||
− | + | For these objects there is an existence theorem, and also the uniqueness theorem that two standard Gaussian functions $ \phi $ | |
+ | and $ \phi ^ \prime $ | ||
+ | on probability spaces $ (X,\ {\mathcal B} , \mu ) $, | ||
+ | $ (X ^ \prime ,\ {\mathcal B} ^ \prime , \mu ^ \prime ) $ | ||
+ | are equivalent in the sense that there is an isomorphism of the two probability spaces under which $ \phi (v) $ | ||
+ | and $ \phi ^ \prime (v) $ | ||
+ | correspond for all $ v \in V $( | ||
+ | cf. [[#References|[a1]]], §4, [[#References|[a3]]], Chap. 1). The uniqueness theorem is a special case of Kolmogorov's theorem that measure spaces are completely determined by consistent joint probability distributions. | ||
− | + | Identifying the symmetric Fock space $ F(V) $ | |
+ | with the space $ L _{2} (X,\ {\mathcal B} ,\ \mu ) $ | ||
+ | realizing the standard Gaussian function on $ H $, | ||
+ | the Wick products of the $ \phi (v) $ | ||
+ | are obtained by taking the usual products and then applying the orthogonal projection of $ F(V) $ | ||
+ | onto its $ n $- | ||
+ | particle subspace. | ||
− | + | In the case of one Gaussian variable $ x $ | |
+ | with probability measure $ \pi ^ {- 1/2} e ^ {- x ^{2} /2} \ dx $, | ||
+ | the above works out as follows: | ||
− | + | $$ | |
+ | : x ^{n} :\ = \ h _{n} (x). | ||
+ | $$ | ||
− | |||
− | A Fock representation in | + | A Fock representation in $ L _{2} ( \mathbf R ,\ (2 \pi ) ^ {- 1/2} e ^ {- x ^{2} /2} \ dx ) $ |
+ | is | ||
− | + | $$ | |
+ | \Omega \ = \ 1 ,\ \ | ||
+ | a \ = \ | ||
+ | \frac{d}{dx} | ||
+ | ,\ \ | ||
+ | a ^{*} \ = \ x - | ||
+ | \frac{d}{dx} | ||
+ | , | ||
+ | $$ | ||
− | |||
− | + | and, indeed, $ h _{n} (x) = (x- d / dx ) ^{n} (1) $, | |
+ | which fits because the creation operator on $ F ( \mathbf R ) $ | ||
+ | is $ a ^{*} (e ^ {\otimes n} ) = e ^ {\otimes (n+1)} $. | ||
+ | In terms of the variable $ y = x / \sqrt 2 $, | ||
+ | |||
+ | |||
+ | $$ | ||
+ | \Omega \ = \ 1,\ \ | ||
+ | a \ = \ | ||
+ | \frac{1}{\sqrt 2} | ||
+ | |||
+ | \frac{d}{dy} | ||
+ | ,\ \ | ||
+ | a ^{*} \ = \ \sqrt 2 y - | ||
+ | \frac{1}{\sqrt 2} | ||
+ | |||
+ | \frac{d}{dy} | ||
+ | , | ||
+ | $$ | ||
+ | |||
+ | |||
+ | $$ | ||
+ | y \ = \ | ||
+ | \frac{1}{\sqrt 2} | ||
+ | (a + a ^{*} ), | ||
+ | $$ | ||
− | |||
and | and | ||
− | + | $$ | |
+ | : y ^{n} :\ = \ ( \sqrt 2 ) ^{-n} h _{n} ( \sqrt 2 y ) \ = \ ( \sqrt 2 ) ^{-n} \sum _{k=0} ^ n | ||
+ | \binom{n}{k} a ^{*k} a ^{n-k} , | ||
+ | $$ | ||
+ | |||
− | where in the "binomial expansion of creation and annihilation operatorsbinomial expansion" of | + | where in the "binomial expansion of creation and annihilation operatorsbinomial expansion" of $ ( (a+a ^{*} ) / \sqrt 2 ) ^{n} $ |
+ | on the right-hand side the annihilation operators $ a $ | ||
+ | all come before the creation operators $ a ^{*} $( | ||
+ | Wick ordening). Suitably interpreted, the same formula holds in general, [[#References|[a3]]], p. 24. | ||
====References==== | ====References==== |
Revision as of 21:37, 28 January 2020
Wick monomial, Wick power
The Wick products of random variables arise through an orthogonalization procedure.
Let $f_1,\ldots,f_n$ be (real-valued) random variables on some probability space $(\Omega,\mathcal{B},\mu)$. The Wick product $$ :f_1^{k_1}\cdots f_n^{k_n}: $$ is defined recursively as a polynomial in $f_1,\ldots,f_n$ of total degree $k_1+\cdots+k_n$ satisfying $$ \left\langle { :f_1^{k_1}\cdots f_n^{k_n}: } \right\rangle = 0 $$ and for $k_i \ge 1$, $$ \frac{\partial}{\partial f_i} \left( { :f_1^{k_1}\cdots f_n^{k_n}: } \right) = k_i :f_1^{k_1}\cdots f_i^{k_i-1} \cdots f_n^{k_n}: $$ where $\langle {\cdot} \rangle$ denotes expectation. The $:\,:$ notation is traditional in physics.
For example, $$ :f: = f - \langle f \rangle \ , $$ $$ :f^2: = f^2 - 2\langle f \rangle f - \langle f^2 \rangle + 2\langle f \rangle^2 \ . $$
There is a binomial theorem: $$ :(af+bg)^n: = \sum_{m=0}^n \binom{n}{m} a^m b^{n-m} :f^m: :g^{n-m}: $$ and a corresponding multinomial theorem. The Wick exponential is defined as $$ :\exp(a f): = \sum_{m=0}^\infty \frac{a^m}{m!} :f^m: $$ so that $$ :\exp(af): = \langle \exp(af) \rangle^{-1} \exp(af) \ . $$
The Wick products, powers and exponentials depend both on the variables involved and on the underlying measure.
Let $f,g$ be Gaussian random variables with mean zero. Then $$ :\exp(af): = \exp\left({ af - \frac12 a^2 \langle f^2 \rangle }\right) $$ $$ :f^n: = \sum_m (-1)^m \frac{ n! }{ m!(n-2m)! 2^m } f^{n-2m} ||f||^{2m} = ||f||^n h_n(||f||^{-1}f) $$ where the $$ h_n(x) = \sum_m (-1)^m \frac{ n! }{ m!(n-2m)! 2^m } x^{n-2m} $$ are the Hermite polynomials with leading coefficient $1$ and $||f||^2 = \langle f^2 \rangle$. Further, $$ \langle :f:^m :g:^m \rangle = \delta_{mn} n! \langle fg \rangle^n \ . $$
This follows from $$ :\exp(af):\,:\exp(bg): = \exp(af+bg) \exp\left( { \frac{-1}{2} (a^2 \langle f^2 \rangle + b^2 \langle g^2 \rangle) } \right) \ , $$ a formula that contains a great deal of the combinatorics of Wick monomials.
If there are two measures $\mu$ and $\nu$ with respect to which $f$ is Gaussian of mean zero, then $$ :\exp(a f) :_\mu = :\exp af :_\nu \exp\left( { \frac{a^2}{2}\langle f^2 \rangle_\mu - \langle f^2 \rangle_\nu } \right) \ . $$
Let $f_1,\ldots,f_n$ be jointly Gaussian variables with mean zero (not necessarily distinct). Then there is an explicit formula for the Wick monomial $:f_1\cdots f_n:$, as follows: $$ :f_1\cdots f_n: = \sum_G \prod_{e \in G} -\left\langle { f_{e_1} f_{e_2} } \right\rangle \prod_{i \not\in [G]} f_i \ . $$
Here, $G$ runs over all pairings of $\{1,\ldots,n\}$ (sometimes called graphs), i.e. all sets of disjoint unordered pairs of $\{1,\ldots,n\}$, $[G]$ is the union of the unordered pairs making up $G$, and if $e$ is an unordered pair, then $\{e_1,e_2\}$ is the set of vertices making up that pair.
For instance, $$ :fg^2: = fg^2 - 2\langle fg \rangle - \langle g^2 \rangle f \ , $$ $$ :f^2g^2: = f^2g^2 - \langle f^2 \rangle g^2 - \langle g^2 \rangle f^2 - 4 \langle fg \rangle fg + 2\langle fg \rangle^2 + \langle f \rangle^2 \langle g \rangle^2 \ . $$
Let $\{ I_\nu \}$, $\nu = 1,\ldots,n$, be a collection of disjoint finite sets. A line on $\{ I_\nu \}$ is by definition a pair of elements taken from different $I_\nu$. A graph on $\{ I_\nu \}$ is a set of disjoint lines on $\{ I_\nu \}$. If each $I_\nu$ is seen as a vertex with $|I_\nu|$ "legs" emanating from it, then $G$ can be visualized as a set of lines joining legs from different vertices. A graph such that all legs are joined is a (certain special kind of) fully contracted graph, vacuum graph, Feynman graph, or Feynman diagram.
The case of "pairings" which occured above corresponds to a graph on $\{ I_\nu \}$ where each vertex has precisely one leg. In terms of these Feynman diagrams a product of Wick monomials is expressed as a linear combination of Wick monomials as follows.
Let $ I _ \nu $, $ \nu = 1 \dots n $, be a collection of disjoint finite sets, $ I = \cup _ \nu I _ \nu $, and $ f _{i} $ a collection of jointly Gaussian random variables indexed by $ I $. Then
$$ \tag{a6} \prod _ \nu : \prod _ {i \in I _ \nu} f _{i} :\ = \ \sum _{G} \prod _ {e \in G} < f _{ {e _ 1}} f _{ {e _ 2}} > : \prod _ {i \notin [G]} f _{i} : , $$
where $ G $
runs over all graphs on $ \{ I _ \nu \} $
and $ [G] $
is the union of all the disjoint unordered pairs making up $ G $.
More general Feynman graphs, such as graphs with also self-interaction lines, occur when several different covariances are involved, cf. [a4].
For the expection of a product of Wick monomials one has
$$ \tag{a7} \left \langle \prod _ \nu : \prod _ {i \in I _ \nu} f _{i} : \right \rangle \ = \ \sum _ {G \in \Gamma _{0} ( \{ I _ \nu \} )} \ \prod _ {e \in G} \langle f _{ {e _ 1}} f _{ {e _ 2}} \rangle $$
and, in particular,
$$ \tag{a8} \langle f _{1} \dots f _{n} \rangle \ = \ \left \{ \begin{array}{ll} 0 &\textrm{ if } \ n \ \textrm{ is } \ \textrm{ odd } , \\ \sum _ {G \in \Gamma _{0} (n)} \ \prod _ {e \in G} \langle f _{ {e _ 1}} f _{ {e _ 2}} \rangle &\ \textrm{ if } \ n=2k , \\ \end{array} \right .$$
where $ \Gamma _{0} (2k) $
runs over all $ (2k)! 2 ^{-k} (k!) ^{-1} $
ways of splitting up $ \{ 1 \dots 2k \} $
into $ k $
unordered pairs. All of the formulas (a1)–(a4), (a7), (a8), especially (a8), generally go by the name Wick's formula or Wick's theorem.
In the setting of (Euclidean) quantum field theory, let $ {\mathcal S} ( \mathbf R ^{n} ) $ be the Schwartz space of rapidly-decreasing smooth functions and let $ {\mathcal S} ^ \prime ( \mathbf R ^{n} ) $ be the space of real-valued tempered distributions. For $ f \in {\mathcal S} ( \mathbf R ^{n} ) $, let $ \phi (f \ ) $ be the linear function on $ {\mathcal S} ^ \prime ( \mathbf R ^{n} ) $ given by $ \phi (f \ )(u) = u(f \ ) $. Then for any continuous positive scalar product $ C $ on $ {\mathcal S} ( \mathbf R ^{n} ) \times {\mathcal S} ( \mathbf R ^{n} ) $, $ (f,\ g) \mapsto \langle f,\ Cg\rangle $, there is a unique countably-additive Gaussian measure $ d q _{C} $ on $ {\mathcal S} ^ \prime ( \mathbf R ^{n} ) $ such that
$$ \int\limits e ^ {\ i \phi (f \ )} \ dq _{C} \ = \ \mathop{\rm exp}\nolimits \left ( - \frac{1}{2} \langle f ,\ C f \ \rangle \right ) ,\ \ f \in {\mathcal S} ( \mathbf R ^{n} ) . $$
Then $ \phi (f \ ) \in L _{p} ( {\mathcal S} ^ \prime ( \mathbf R ^{n} ) ,\ d q _{C} ) $
for all $ p \in [1,\ \infty ) $
and
$$ \int\limits \phi (f \ ) \ dq _{C} \ = \ 0 , $$
$$
\int\limits \phi (f _{1} ) \phi (f _{2} ) \ d q _{C} \ = \ \langle f _{1} ,\ Cf _{2} \rangle .
$$
So $ \langle \phi (f _{1} ) \phi (f _{2} ) \rangle = \langle f _{1} ,\ Cf _{2} \rangle $,
and some of the formulas of Wick monomials, etc., now take the form
$$ \tag{a3\prime} : \phi (f \ ) ^{n} :\ = $$
$$
= \
\sum _{j}
\frac{n!}{(n-2j)! j! 2 ^ j}
(-1)
^{j} \langle f,\ Cf \ \rangle ^{j} \phi (f \ ) ^{n-2j\ } =
$$
$$
= \
\langle f,\ Cf \ \rangle ^{n/2} h _{n} \left (
\frac{\phi (f \ )}{\langle f,\ Cf \ \rangle ^ 1/2}
\right ) ,
$$
$$ \tag{a5\prime}
: \prod _ {\nu =1} ^ n \phi (f _ \nu ) : \ = \ \sum
_{G} \prod _ {e \in G} < f _{ {e _ 1}} ,\ - Cf
_{ {e _ 2}} > \prod _ {i \notin [G]} \phi (f _{i} ) .
$$
Wick monomials have much to do with the Fock space via the Itô–Wick–Segal isomorphism. This rest on either of two narrowly related uniqueness theorems: the uniqueness of standard Gaussian functions or the uniqueness of Fock representations.
Let $ {\mathcal S} $ be a pre-Hilbert space. A representation of the canonical commutation relations over $ {\mathcal S} $ is a pair of linear mappings
$$ f \ \mapsto \ a(f \ ) ,\ \ g \ \mapsto \ a ^{*} (g) $$
from $ {\mathcal S} $
to operators $ a(f \ ) $,
$ a ^{*} (g) $
defined on a dense domain $ D $
in a complex Hilbert space $ H $
such that
$$ a(f \ ) D \ \subset \ D ,\ \ a ^{*} (g) D \ \subset \ D , $$
$$
\langle x _{1} ,\ a (f \ )x _{2} \rangle \ = \ \langle a ^{*} (f \ )x _{1} ,\ x _{2} \rangle ,
$$
$$
[a(f \ ),\ a(g)] \ = \ [a ^{*} (f \ ),\ a ^{*} (g)] \ = \ 0,
$$
$$
[a(f \ ),\ a ^{*} (g)] x \ = \ \langle f,\ g\rangle x ,
$$
for all $ x,\ x _{1} ,\ x _{2} \in D $,
$ f ,\ g \in {\mathcal S} $.
The representation is called a Fock representation if there is moreover an $ \Omega \in D $,
called the vacuum vector, such that
$$ a(f \ ) \Omega \ = \ 0 ,\ \ f \in {\mathcal S} , $$
and such that $ D $
is the linear space span of the vectors $ a ^{*} (g _{1} ) \dots a ^{*} (g _{k} ) \Omega $,
$ g _{i} \in {\mathcal S} $,
$ k = 0,\ 1,\dots $.
There is an existence theorem (cf. Fock space and Commutation and anti-commutation relationships, representation of) and the uniqueness theorem: If $ (a _{i} ,\ a _{i} ^{*} ) $
are two Fock representations over $ {\mathcal S} $
with vacuum vectors $ \Omega _{i} $,
then they are unitarily equivalent and the unitary equivalence $ U $
is uniquely determined by $ U \Omega _{1} = \Omega _{2} $.
A standard Gaussian function on a real Hilbert space $ V $(
called a Gaussian random process indexed by $ V $
in [a3]) is a mapping $ \phi $
from $ V $
to the random variables on a probability space $ (X ,\ {\mathcal B} ,\ \mu ) $
such that (almost everywhere)
$$ \phi (v+w) \ = \ \phi (v)+ \phi (w) ,\ \ v,\ w \in V , $$
$$
\phi ( \alpha v ) \ = \ \alpha \phi ( v) ,\ \ \alpha \in \mathbf R ,\ \ v \in V ,
$$
such that the $ \sigma $-
algebra generated by the $ \phi (f \ ) $
is $ {\mathcal B} $(
up to the sets of measure zero) and such that
$ \phi (v) $ is a Gaussian random variable of mean zero, and
$ \langle \phi (v) \phi (w)\rangle = \langle v,\ w\rangle $.
For these objects there is an existence theorem, and also the uniqueness theorem that two standard Gaussian functions $ \phi $
and $ \phi ^ \prime $
on probability spaces $ (X,\ {\mathcal B} , \mu ) $,
$ (X ^ \prime ,\ {\mathcal B} ^ \prime , \mu ^ \prime ) $
are equivalent in the sense that there is an isomorphism of the two probability spaces under which $ \phi (v) $
and $ \phi ^ \prime (v) $
correspond for all $ v \in V $(
cf. [a1], §4, [a3], Chap. 1). The uniqueness theorem is a special case of Kolmogorov's theorem that measure spaces are completely determined by consistent joint probability distributions.
Identifying the symmetric Fock space $ F(V) $ with the space $ L _{2} (X,\ {\mathcal B} ,\ \mu ) $ realizing the standard Gaussian function on $ H $, the Wick products of the $ \phi (v) $ are obtained by taking the usual products and then applying the orthogonal projection of $ F(V) $ onto its $ n $- particle subspace.
In the case of one Gaussian variable $ x $ with probability measure $ \pi ^ {- 1/2} e ^ {- x ^{2} /2} \ dx $, the above works out as follows:
$$ : x ^{n} :\ = \ h _{n} (x). $$
A Fock representation in $ L _{2} ( \mathbf R ,\ (2 \pi ) ^ {- 1/2} e ^ {- x ^{2} /2} \ dx ) $
is
$$ \Omega \ = \ 1 ,\ \ a \ = \ \frac{d}{dx} ,\ \ a ^{*} \ = \ x - \frac{d}{dx} , $$
and, indeed, $ h _{n} (x) = (x- d / dx ) ^{n} (1) $,
which fits because the creation operator on $ F ( \mathbf R ) $
is $ a ^{*} (e ^ {\otimes n} ) = e ^ {\otimes (n+1)} $.
In terms of the variable $ y = x / \sqrt 2 $,
$$
\Omega \ = \ 1,\ \
a \ = \
\frac{1}{\sqrt 2}
\frac{d}{dy}
,\ \
a ^{*} \ = \ \sqrt 2 y -
\frac{1}{\sqrt 2}
\frac{d}{dy}
,
$$
$$
y \ = \
\frac{1}{\sqrt 2}
(a + a ^{*} ),
$$
and
$$ : y ^{n} :\ = \ ( \sqrt 2 ) ^{-n} h _{n} ( \sqrt 2 y ) \ = \ ( \sqrt 2 ) ^{-n} \sum _{k=0} ^ n \binom{n}{k} a ^{*k} a ^{n-k} , $$
where in the "binomial expansion of creation and annihilation operatorsbinomial expansion" of $ ( (a+a ^{*} ) / \sqrt 2 ) ^{n} $
on the right-hand side the annihilation operators $ a $
all come before the creation operators $ a ^{*} $(
Wick ordening). Suitably interpreted, the same formula holds in general, [a3], p. 24.
References
[a1] | R.L. Dobrushin, R.A. Minlos, "Polynomials in linear random functions" Russian Math. Surveys , 32 (1977) pp. 71–127 Uspekhi Mat. Nauk , 32 (1977) pp. 67–122 |
[a2] | J. Dimock, J. Glimm, "Measures on Schwartz distribution space and applications to $P(\phi)_2$ field theories" Adv. in Math. , 12 (1974) pp. 58–83 |
[a3] | B. Simon, "The $P(\phi)_2$ Euclidean (quantum) field theory" , Princeton Univ. Press (1974) |
[a4] | J. Glimm, A. Jaffe, "Quantum physics, a functional integral point of view" , Springer (1981) |
Wick product. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Wick_product&oldid=41930