Publication Date:
2016-11-15
Description:
Author(s): Kristina R. King, Steven J. Weinstein, Paula M. Zaretzky, Michael Cromer, and Nathaniel S. Barlow A widely unexplored type of hydrodynamic instability is examined—long-time algebraic growth. Such growth can occur on the threshold of neutral stability, as classified by dispersion relations arising from exponential normal modes. The morphology of responses exhibiting algebraic growth are compared with those of well-known exponential growth. [Phys. Rev. Fluids 1, 073604] Published Fri Nov 11, 2016
Keywords:
Flow instability
Electronic ISSN:
2469-990X
Topics:
Physics
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