In statistical mechanics, an Ursell function or connected correlation function, is a

cumulant In probability theory and statistics, the cumulants of a probability distribution are a set of quantities that provide an alternative to the '' moments'' of the distribution. Any two probability distributions whose moments are identical will hav ...

of a

random variable A random variable (also called random quantity, aleatory variable, or stochastic variable) is a mathematical formalization of a quantity or object which depends on random events. It is a mapping or a function from possible outcomes (e.g., the p ...

. It can often be obtained by summing over connected

Feynman diagram In theoretical physics, a Feynman diagram is a pictorial representation of the mathematical expressions describing the behavior and interaction of subatomic particles. The scheme is named after American physicist Richard Feynman, who introdu ...

s (the sum over all Feynman diagrams gives the

correlation function A correlation function is a function that gives the statistical correlation between random variables, contingent on the spatial or temporal distance between those variables. If one considers the correlation function between random variables re ...

s). The Ursell function was named after

Harold Ursell Harold Douglas Ursell (1907–1969) was an English mathematician who is best known for Ursell function In statistical mechanics, an Ursell function or connected correlation function, is a cumulant of a random variable. It can often be obtained ...

, who introduced it in 1927.

Definition

If ''X'' is a random variable, the moments ''s''_''n'' and cumulants (same as the Ursell functions) ''u''_''n'' are functions of ''X'' related by the

exponential formula In combinatorial mathematics, the exponential formula (called the polymer expansion in physics) states that the exponential generating function for structures on finite sets is the exponential of the exponential generating function for connected s ...

: :

\operatorname(\exp(zX)) = \sum_n s_n \frac = \exp\left(\sum_n u_n \frac\right)

(where

\operatorname

is the

expectation Expectation or Expectations may refer to: Science * Expectation (epistemic) * Expected value, in mathematical probability theory * Expectation value (quantum mechanics) * Expectation–maximization algorithm, in statistics Music * ''Expectation' ...

). The Ursell functions for multivariate random variables are defined analogously to the above, and in the same way as multivariate cumulants. :

u_n\left(X_1, \ldots, X_n\right) = \left.\frac \cdots \frac\log \operatorname\left(\exp\sum z_i X_i\right)\_

The Ursell functions of a single random variable ''X'' are obtained from these by setting . The first few are given by :

\begin
                            u_1(X_1) = &\operatorname(X_1) \\
                       u_2(X_1, X_2) = &\operatorname(X_1 X_2) - \operatorname(X_1) \operatorname(X_2) \\
                  u_3(X_1, X_2, X_3) = &\operatorname(X_1 X_2 X_3) - \operatorname(X_1) \operatorname(X_2 X_3) - \operatorname(X_2) \operatorname(X_3 X_1) - \operatorname(X_3) \operatorname(X_1 X_2) + 2 \operatorname(X_1) \operatorname(X_2) \operatorname(X_3) \\
  u_4\left(X_1, X_2, X_3, X_4\right) =
    &\operatorname(X_1 X_2 X_3 X_4) - \operatorname(X_1) \operatorname(X_2 X_3 X_4) - \operatorname(X_2) \operatorname(X_1 X_3 X_4) - \operatorname(X_3) \operatorname(X_1 X_2 X_4) - \operatorname(X_4) \operatorname(X_1 X_2 X_3) \\
    & - \operatorname(X_1 X_2) \operatorname(X_3 X_4) - \operatorname(X_1 X_3) \operatorname(X_2 X_4) - \operatorname(X_1 X_4) \operatorname(X_2 X_3) \\
    & + 2 \operatorname(X_1 X_2) \operatorname(X_3) \operatorname(X_4) + 2 \operatorname(X_1 X_3) \operatorname(X_2) \operatorname(X_4) + 2 \operatorname(X_1 X_4) \operatorname(X_2) \operatorname(X_3) + 2 \operatorname(X_2 X_3) \operatorname(X_1) \operatorname(X_4) \\
    & + 2 \operatorname(X_2 X_4) \operatorname(X_1) \operatorname(X_3) + 2 \operatorname(X_3 X_4) \operatorname(X_1) \operatorname(X_2) - 6 \operatorname(X_1) \operatorname(X_2) \operatorname(X_3) \operatorname(X_4)
\end

Characterization

showed that the Ursell functions, considered as multilinear functions of several random variables, are uniquely determined up to a constant by the fact that they vanish whenever the variables ''X''_''i'' can be divided into two nonempty independent sets.

References

* * *{{citation, first=H. D. , last=Ursell, title=The evaluation of Gibbs phase-integral for imperfect gases, journal=Proc. Cambridge Philos. Soc., volume=23 , year=1927, issue=6, pages=685–697, doi=10.1017/S0305004100011191, bibcode=1927PCPS...23..685U, s2cid=123023251 Statistical mechanics Theory of probability distributions

Definition

Characterization

See also

References