A spatial analog of the Ruelle-Takens-Newhouse scenario developing in reactive miscible fluids (1906.02050v1)

Abstract: We present a theoretical study on pattern formation occurring in miscible fluids reacting by a second-order reaction $A + B \to S$ in a vertical Hele-Shaw cell under constant gravity. We have recently reported that concentration-dependent diffusion of species coupled with a frontal neutralization reaction can produce a multi-layer system where low density depleted zones could be embedded between the denser layers. This leads to the excitation of chemoconvective modes spatially separated from each other by a motionless fluid. In this paper, we show that the layers can interact via a diffusion mechanism. Since diffusively-coupled instabilities initially have different wavelengths, this causes a long-wave modulation of one pattern by another. We have developed a mathematical model which includes a system of reaction-diffusion-convection equations. The linear stability of a transient base state is studied by calculating the growth rate of the Lyapunov exponent for each unstable layer. Numerical simulations supported by the phase portrait reconstruction and Fourier spectra calculation have revealed that nonlinear dynamics consistently passes through (i) a perfect spatially periodic system of chemoconvective cells; (ii) a quasi-periodic system of the same cells; (iii) a disordered fingering structure. We show that in this system, the coordinate co-directed to the reaction front paradoxically plays the role of time, time itself acts as a bifurcation parameter, and a complete spatial analog of the Ruelle-Takens-Newhouse scenario of the chaos onset is observed.