1998
DOI: 10.1063/1.869784
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Steep nonlinear global modes in spatially developing media

Abstract: International audienceA new frequency selection criterion valid in the fully nonlinear regime is presented for extended oscillating states in spatially developing media. The spatial structure and frequency of these modes are dominated by the existence of a sharp front connecting linear to nonlinear regions. A new type of fully nonlinear time harmonic solutions called steep global modes is identified in the context of the supercritical complex Ginzburg-Landau equation with slowly varying coefficients. A similar… Show more

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Cited by 66 publications
(100 citation statements)
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References 16 publications
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“…Hannemann & Oertel 1989;Zielinska & Westfreid 1995;Pier & Huerre 1996) suggests that the form of the linear global mode is qualitatively preserved, with nonlinear effects leading to saturation and in some cases causing the global frequency to rise slightly. The exception to this is the steep nonlinear global mode discovered by Pier et al (1998) which may be more relevant in the present case.…”
Section: Referred To As I)mentioning
confidence: 67%
“…Hannemann & Oertel 1989;Zielinska & Westfreid 1995;Pier & Huerre 1996) suggests that the form of the linear global mode is qualitatively preserved, with nonlinear effects leading to saturation and in some cases causing the global frequency to rise slightly. The exception to this is the steep nonlinear global mode discovered by Pier et al (1998) which may be more relevant in the present case.…”
Section: Referred To As I)mentioning
confidence: 67%
“…The corresponding extended spatial structure displays smoothly varying amplitude and wavenumber everywhere. By contrast, steep global modes, as described by Pier et al (1998), obey a marginal stability criterion: the steep global frequency coincides with the real absolute frequency at the transition station between linear convective and absolute instability. More specifically, the steep global mode is triggered at the upstream boundary X ca of the absolutely unstable domain and is tuned at the associated real absolute frequency…”
Section: Introductionmentioning
confidence: 99%
“…The frequency (and nature) of such global modes can be explored by analysing the complex, nonlinear GinzburgLandau equation as a model of the flow (e.g. Pier et al 1998;Pier & Huerre 2001). Alternatively, it is possible to undertake (usually numerically) a linear stability analysis of full pre-computed solutions of spatially developing flows, to identify their stability and the frequency of any global mode which might result (e.g.…”
Section: Introductionmentioning
confidence: 99%