Open Access Open Access  Restricted Access Subscription Access
Open Access Open Access Open Access  Restricted Access Restricted Access Subscription Access

A Characterization Theorem in Rotatory Thermohaline Convection of Veronis Type in Porous Medium


Affiliations
1 Department of Mathematics, Himachal Pradesh University, Summer Hill, Shimla-171005, India
     

   Subscribe/Renew Journal


The present paper mathematically establishes that rotatory thermohaline convection of the Veronis type in porous medium cannot manifest itself as oscillatory motion of growing amplitude in an initially bottom heavy configuration if the thermohaline Rayleigh number Rs, the Lewis number , the Prandtl number p1, the porosity , satisfy the inequality Rs≤4π2 (1/P>l +τ/(E'∈p1 )) , where Pl and E' are constants which depend upon porosity of the medium. It further establishes that this result is uniformly valid for the quite general nature of the bounding surfaces.
Subscription Login to verify subscription
User
Notifications
Font Size


Abstract Views: 359

PDF Views: 0




  • A Characterization Theorem in Rotatory Thermohaline Convection of Veronis Type in Porous Medium

Abstract Views: 359  |  PDF Views: 0

Authors

Jyoti Prakash
Department of Mathematics, Himachal Pradesh University, Summer Hill, Shimla-171005, India
Sanjay Kumar Gupta
Department of Mathematics, Himachal Pradesh University, Summer Hill, Shimla-171005, India

Abstract


The present paper mathematically establishes that rotatory thermohaline convection of the Veronis type in porous medium cannot manifest itself as oscillatory motion of growing amplitude in an initially bottom heavy configuration if the thermohaline Rayleigh number Rs, the Lewis number , the Prandtl number p1, the porosity , satisfy the inequality Rs≤4π2 (1/P>l +τ/(E'∈p1 )) , where Pl and E' are constants which depend upon porosity of the medium. It further establishes that this result is uniformly valid for the quite general nature of the bounding surfaces.