Statistical properties of non-linear observables of fractal Gaussian fields with a focus on spatial-averaging observables and on composite operators

Abstract

The statistical properties of non-linear observables of the fractal Gaussian field φ( x) of negative Hurst exponent H<0 in dimension d are revisited with a focus on spatial-averaging observables and on the properties of the finite parts φn( x) of the ill-defined composite operators φn( x) . For the special case n=2 of quadratic observables, explicit results include the cumulants of arbitrary order, the L\'evy-Khintchine formula for the characteristic function and the anomalous large deviations properties. The case of observables of arbitrary order n>2 is analyzed via the Wiener-Ito chaos-expansion for functionals of the white noise: the multiple stochastic Ito integrals are useful to identify the finite parts φn( x) of the ill-defined composite operators φn( x) and to compute their correlations involving the Hurst exponents Hn=nH.