2004
DOI: 10.1070/pu2004v047n09abeh001742
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Waves and patterns in reaction–diffusion systems. Belousov–Zhabotinsky reaction in water-in-oil microemulsions

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Cited by 86 publications
(49 citation statements)
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“…6,7 The combination of a chemical oscillator with peculiar reaction environments is a subject extensively studied during the past years. In particular, examples about BZ reaction include gels, 8 synthetic membranes, 9 ion-exchange resins, 10 micelles, 11,12 polymers, 13,14 water in oil reverse microemulsions, 15,16 and lipid bilayers. 17,18 Among the above-mentioned modifying reaction media, surfactant forming micelles revealed to be very intriguing and promising.…”
Section: Introductionmentioning
confidence: 99%
“…6,7 The combination of a chemical oscillator with peculiar reaction environments is a subject extensively studied during the past years. In particular, examples about BZ reaction include gels, 8 synthetic membranes, 9 ion-exchange resins, 10 micelles, 11,12 polymers, 13,14 water in oil reverse microemulsions, 15,16 and lipid bilayers. 17,18 Among the above-mentioned modifying reaction media, surfactant forming micelles revealed to be very intriguing and promising.…”
Section: Introductionmentioning
confidence: 99%
“…[170][171][172] We recently found that cross-diffusion in BZ-AOT microemulsions is quite significant and may therefore be responsible for many of the wealth of patterns observed in this system. 93 A sampling of BZ-AOT patterns is shown in Fig.…”
Section: C Cross-diffusion In Physicochemical Systemsmentioning
confidence: 99%
“…In particular, pinning solutions characterized by a coexistence of Turing and Hopf states have been observed in [26] in the vicinity of a codimension two Turing-Hopf point (C2THP) of the (nonvariational) Brusselator model (see e.g., [27][28][29] and the references therein), where both the Turing and Hopf bifurcations were supercritical and stable. Turing-Hopf coexistence has also been observed experimentally, as in [30] for the voltages and currents of resistively coupled nonlinear LC oscillators arranged in a one-dimensional chain and driven by a constant voltage at one end.…”
Section: Introductionmentioning
confidence: 99%