Probabilistic representation of fundamental solutions to ∂ u∂ t = m ∂m u∂ xm

Abstract

For the fundamental solutions of heat-type equations of order n we give a general stochastic representation in terms of damped oscillations with generalized gamma distributed parameters. By composing the pseudo-process Xn related to the higher-order heat-type equation with positively skewed stable r.v.'s Tj1/3, j=1,2, ..., n we obtain genuine r.v.'s whose explicit distribution is given for n=3 in terms of Cauchy asymmetric laws. We also prove that X3(T11/3(...(Tn(1/3)(t))...)) has a stable asymmetric law.