Dynamical-systems analysis and unstable periodic orbits in reacting flows behind symmetric bluff bodies.

Dynamical systems analysis is performed for reacting flows stabilized behind four symmetric bluff bodies to determine the effects of shape on the nature of flame stability, acoustic coupling, and vortex shedding. The task requires separation of regular, repeatable aspects of the flow from experimental noise and highly irregular, nonrepeatable small-scale structures caused primarily by viscous-mediated energy cascading. The experimental systems are invariant under a reflection, and symmetric vortex shedding is observed throughout the parameter range. As the equivalence ratio-and, hence, acoustic coupling-is reduced, a symmetry-breaking transition to von Karman vortices is initiated. Combining principal-components analysis with a symmetry-based filtering, we construct bifurcation diagrams for the onset and growth of von Karman vortices. We also compute Lyapunov exponents for each flame holder to help quantify the transitions. Furthermore, we outline changes in the phase-space orbits that accompany the onset of von Karman vortex shedding and compute unstable periodic orbits (UPOs) embedded in the complex flows prior to and following the bifurcation. For each flame holder, we find a single UPO in flows without von Karman vortices and a pair of UPOs in flows with von Karman vortices. These periodic orbits organize the dynamics of the flow and can be used to reduce or control flow irregularities. By subtracting them from the overall flow, we are able to deduce the nature of irregular facets of the flows.

[1]  T. Lieuwen,et al.  Coherent acoustic wave amplification/damping by wrinkled flames , 2003 .

[2]  Cvitanovic,et al.  Invariant measurement of strange sets in terms of cycles. , 1988, Physical review letters.

[3]  Mark N. Glauser,et al.  Coherent Structures in the Axisymmetric Turbulent Jet Mixing Layer , 1987 .

[4]  P. Grassberger,et al.  Characterization of Strange Attractors , 1983 .

[5]  Mogens H. Jensen,et al.  Universal strange attractors on wrinkled tori , 1988 .

[6]  Stavroula Balabani,et al.  Symmetric vortex shedding in the near wake of a circular cylinder due to streamwise perturbations , 2007 .

[7]  Michael Gorman,et al.  Cellular pattern formation in circular domains. , 1997, Chaos.

[8]  Marc W Slutzky,et al.  Identification of determinism in noisy neuronal systems , 2002, Journal of Neuroscience Methods.

[9]  Auerbach,et al.  Exploring chaotic motion through periodic orbits. , 1987, Physical review letters.

[10]  Prashant G. Mehta,et al.  Impact of exothermicity on steady and linearized response of a premixed ducted flame , 2005 .

[11]  Roy,et al.  Dynamical control of a chaotic laser: Experimental stabilization of a globally coupled system. , 1992, Physical review letters.

[12]  Adaptive control and tracking of chaos in a magnetoelastic ribbon. , 1995, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[13]  Cvitanovic,et al.  Topological and metric properties of Hénon-type strange attractors. , 1988, Physical review. A, General physics.

[14]  L. Sirovich Turbulence and the dynamics of coherent structures. II. Symmetries and transformations , 1987 .

[15]  D. Nie,et al.  VORTEX SHEDDING PATTERNS IN FLOW PAST INLINE OSCILLATING ELLIPTICAL CYLINDERS , 2012 .

[16]  Michael Gorman,et al.  Modal decomposition of hopping states in cellular flames. , 1999, Chaos.

[17]  Yueheng Lan,et al.  Variational method for finding periodic orbits in a general flow. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[18]  L. Sirovich Turbulence and the dynamics of coherent structures. III. Dynamics and scaling , 1987 .

[19]  Gunaratne,et al.  Chaos beyond onset: A comparison of theory and experiment. , 1989, Physical review letters.

[20]  James R. Gord,et al.  Characterization of flame-shedding behavior behind a bluff-body using proper orthogonal decomposition , 2012 .

[21]  T. Maxworthy ON THE MECHANISM OF BLUFF BODY FLAME STABILIZATION AT LOW VELOCITIES , 1962 .

[22]  Charles-Henri Bruneau,et al.  Enablers for robust POD models , 2009, J. Comput. Phys..

[23]  D. Armbruster,et al.  Classification of Z(2)‐Equivariant Imperfect Bifurcations with Corank 2 , 1983 .

[24]  T. Matsunaka,et al.  Physiological and Pharmacological Responses of Arterial Graft Flow After Coronary Artery Bypass Grafting Measured With an Implantable Ultrasonic Doppler Miniprobe , 1992, Circulation.

[25]  M. Cross,et al.  Pattern formation outside of equilibrium , 1993 .

[26]  A Garfinkel,et al.  Chaos control of cardiac arrhythmias. , 1995, Trends in cardiovascular medicine.

[27]  Procaccia,et al.  Organization of chaos. , 1987, Physical review letters.

[28]  M. Slutzky,et al.  Deterministic Chaos and Noise in Three In Vitro Hippocampal Models of Epilepsy , 2004, Annals of Biomedical Engineering.

[29]  M. El-Hamdi,et al.  Chaotic dynamics near the extinction limit of a premixed flame on a porous plug burner , 1994 .

[30]  L. Glass,et al.  DYNAMIC CONTROL OF CARDIAC ALTERNANS , 1997 .

[31]  Robin J. Evans,et al.  Control of chaos: Methods and applications in engineering, , 2005, Annu. Rev. Control..

[32]  James R. Gord,et al.  Nonlinear Thermoacoustic Instability Dynamics in a Rijke Tube , 2012 .

[33]  Tim Lieuwen,et al.  Modeling Premixed Combustion-Acoustic Wave Interactions: A Review , 2003 .

[34]  B. Mandelbrot How Long Is the Coast of Britain? Statistical Self-Similarity and Fractional Dimension , 1967, Science.

[35]  W. Ditto,et al.  Controlling chaos in the brain , 1994, Nature.

[36]  A. Wolf,et al.  Determining Lyapunov exponents from a time series , 1985 .

[37]  J. Frøyland Lyapunov exponents for multidimensional orbits , 1983 .

[38]  Coullet,et al.  Instabilities of one-dimensional cellular patterns. , 1990, Physical review letters.

[39]  L. Sirovich Turbulence and the dynamics of coherent structures. I. Coherent structures , 1987 .

[40]  B. Cetegen,et al.  Blowoff dynamics of bluff body stabilized turbulent premixed flames , 2010 .

[41]  K. Showalter,et al.  Controlling spatiotemporal dynamics of flame fronts , 1994 .

[42]  M. Golubitsky,et al.  Singularities and groups in bifurcation theory , 1985 .

[43]  Jean Hertzberg,et al.  Vortex shedding behind rod stabilized flames , 1991 .

[44]  A Garfinkel,et al.  Controlling cardiac chaos. , 1992, Science.

[45]  P. Schmid,et al.  Dynamic mode decomposition of numerical and experimental data , 2008, Journal of Fluid Mechanics.

[46]  Celso Grebogi,et al.  Using small perturbations to control chaos , 1993, Nature.

[47]  P. Grassberger,et al.  Measuring the Strangeness of Strange Attractors , 1983 .

[48]  P. Holmes,et al.  The Proper Orthogonal Decomposition in the Analysis of Turbulent Flows , 1993 .