Dr. Hari Mohan

Lecturer
Himachal Pradesh University, India

Highest Degree
Ph.D. in Applied Mathematics from Himachal Pradesh University, Shimla, India

My URL
https://livedna.org/91.3525

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Area of Interest:

Mathematics
Statistics
Applied Mathematics
Physical Sciecnes
Pure Mathematics

Selected Publications

  1. Mohan, H. and P. Kumar, 2011. On hydromagnetic thermosolutal convection coupled with cross-diffusion in completely confined fluids. Theoret. Applied Mech., 38: 17-36.
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  2. Kumar, P. and H. Mohan, 2011. Double-diffusive magneto convection in a compressible couple-stress fluid through porous medium. Z. Naturforsch., 66a: 304-310.
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  3. Sharma, H.M., 2010. Bound for complex growth rate in thermosolutal convection coupled with cross-diffusions. Appl. Applied Math.: An Int. J., 5: 1428-1441.
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  4. Mohan, H., P. Kumar and P. Singh, 2009. On the magnetorotatory thermosolutal convection (MRTC) of the veronis type in the presence of soret effect. Stud. Geotech. Mech., 31: 51-63.
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  5. Kumar, P., H. Mohan and R. Lal, 2006. Effect of magnetic field on thermal instability of a rotating rivlin- ericksen viscoelastic fluid. Int. J. Math. Math. Sci. 10.1155/IJMMS/2006/28042.
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  6. Kumar, P., H. Mohan and G.J. Singh, 2006. Stability of two superposed viscoelastic fluid-particle mixtures. J. Applied Math. Mech. ZAMM, Germany, 86: 72-77.
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  7. Kumar, P., H. Mohan and P. Singh, 2005. On generalized hydromagnetic thermosolutal convection: The dufour-effect. J. Thermal Sci., 9: 139-150.
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  8. Kumar, P., H. Mohan and G.J. Singh, 2004. Rayleigh-taylor instability of rotating oldroydian viscoelastic fluids in porous medium in presence of a variable magnetic field. Transp. Porous Media Neth., 56: 199-208.
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  9. Mohan, H. and Anjula, 2002. Dufour-driven thermosolutal convection in completely confined fluids. Indian J. Pure Applied Math., 33: 287-300.

  10. Mohan, H., 1998. Upper limits to the complex growth rate in veronis' and stern's thermohaline configurations. Indian J. Pure Applied Math., 29: 289-297.
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  11. Mohan, H., 1998. Dufour-driven thermosolutal convection of the veronis' type. J. Math. Analy. Appl., 218: 569-580.
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  12. Mohan, H., 1996. The soret effect on the rotatory thermosolutal convection of the veronis' type. Indian J. Pure Applied Math., 27: 600-619.
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  13. Gupra, J.R. and H. Mohan, 1993. On the limitations of the linear growth rate in veronis' and stern's thermohaline configurations. Indian J. Pure Applied Math., 24: 61-67.
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Member since June, 2010