The analysis of transport-controlled reactions in chaotic flows provides a physical frame to extend the concept of the intermaterial contact area (ICA) - introduced in the purely kinematic case-to mixing systems with diffusion, where the ICA is identified through the reaction interface between segregated reactants. We show that the dynamics of the ICA undergoes a crossover from kinematics-dominated exponential growth to a persistent oscillatory regime resulting from the intertwined action of advection and diffusion. The scaling of the crossover length versus the Peclet number is analyzed.
Geometry of reaction interfaces in chaotic flows / Giona, Massimiliano; Cerbelli, Stefano; Adrover, Alessandra. - In: PHYSICAL REVIEW LETTERS. - ISSN 0031-9007. - 88:2(2001), pp. 245011-245014. [10.1103/physrevlett.88.024501]
Geometry of reaction interfaces in chaotic flows
GIONA, Massimiliano;CERBELLI, Stefano;ADROVER, Alessandra
2001
Abstract
The analysis of transport-controlled reactions in chaotic flows provides a physical frame to extend the concept of the intermaterial contact area (ICA) - introduced in the purely kinematic case-to mixing systems with diffusion, where the ICA is identified through the reaction interface between segregated reactants. We show that the dynamics of the ICA undergoes a crossover from kinematics-dominated exponential growth to a persistent oscillatory regime resulting from the intertwined action of advection and diffusion. The scaling of the crossover length versus the Peclet number is analyzed.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.