Data di Pubblicazione:
2012
Abstract:
Pulvirenti and Toscani introduced an equation which extends the Kac caricature
of aMaxwellian gas to inelastic particles.We show that the probability distribution, solution
of the relative Cauchy problem, converges weakly to a probability distribution if and only if
the symmetrized initial distribution belongs to the standard domain of attraction of a symmetric
stable law, whose index α is determined by the so-called degree of inelasticity,p >0,
of the particles: α = 2
1+p . This result is then used: (1) To state that the class of all stationary
solutions coincides with that of all symmetric stable laws with index α. (2) To determine the
solution of a well-known stochastic functional equation in the absence of extra-conditions
usually adopted.
of aMaxwellian gas to inelastic particles.We show that the probability distribution, solution
of the relative Cauchy problem, converges weakly to a probability distribution if and only if
the symmetrized initial distribution belongs to the standard domain of attraction of a symmetric
stable law, whose index α is determined by the so-called degree of inelasticity,p >0,
of the particles: α = 2
1+p . This result is then used: (1) To state that the class of all stationary
solutions coincides with that of all symmetric stable laws with index α. (2) To determine the
solution of a well-known stochastic functional equation in the absence of extra-conditions
usually adopted.
Tipologia CRIS:
1.1 Articolo in rivista
Keywords:
central limit theorem; convergence to equilibrium; inelastic Kac equation; stable law; standard domain of attraction
Elenco autori:
Gabetta, Ester; Regazzini, Eugenio
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