This article demonstrates the existence of a nonuniform stationary measure (referred to as the w-invariant measure) associated with the statistical space-filling properties of the unstable invariant foliation in 2D differentiable area-preserving systems and derives a sequence of analytical approximations for it. In fluid-dynamic problems, the w-measure coincides with the intermaterial contact area density.
Nonuniform stationary measure of the invariant unstable foliation in Hamiltonian and fluid mixing systems / Giona, Massimiliano; Adrover, Alessandra. - In: PHYSICAL REVIEW LETTERS. - ISSN 0031-9007. - STAMPA. - 81:18(1998), pp. 3864-3867.
Nonuniform stationary measure of the invariant unstable foliation in Hamiltonian and fluid mixing systems
GIONA, Massimiliano;ADROVER, Alessandra
1998
Abstract
This article demonstrates the existence of a nonuniform stationary measure (referred to as the w-invariant measure) associated with the statistical space-filling properties of the unstable invariant foliation in 2D differentiable area-preserving systems and derives a sequence of analytical approximations for it. In fluid-dynamic problems, the w-measure coincides with the intermaterial contact area density.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
