Convectons in a rotating fluid layer | Zendy

Cédric Beaume | Zendy; Alain Bergeon | Zendy; Hsien-Ching Kao | Zendy; Edgar Knobloch | Zendy

AI Assistant Blog Pricing

Home ZAIA Blog

Open Access

Convectons in a rotating fluid layer

Author(s) -

Cédric Beaume,

Alain Bergeon,

Hsien-Ching Kao,

Edgar Knobloch

Publication year - 2013

Publication title -

journal of fluid mechanics

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 1.72

H-Index - 226

eISSN - 1469-7645

pISSN - 0022-1120

DOI - 10.1017/jfm.2012.585

Subject(s) - convection , mechanics , bifurcation , boundary layer , physics , shear stress , bounded function , shear (geology) , shear flow , plane (geometry) , classical mechanics , geometry , materials science , mathematical analysis , mathematics , quantum mechanics , nonlinear system , composite material

Two-dimensional convection in a plane layer bounded by stress-free perfectly conducting horizontal boundaries and rotating uniformly about the vertical is considered. Time independent spatially localized structures, called convectons, of even and odd parity are computed. The convectons are embedded within a self-generated shear layer with a compensating shear flow outside the structure. These states are organized within a bifurcation structure called slanted snaking and may be present even when periodic convection sets in supercritically. These interesting properties are traced to the presence of a conserved quantity and hence to the use of stress-free boundary conditions

The content you want is available to Zendy users.

Already have an account? Click here to sign in.

Having issues? You can contact us here

Accelerating Research