University of Tabriz Computational Methods for Differential Equations 2345-3982 14 2 2026 04 01 A mathematical and computational study of global stability in partially-ionized rotating plasma 502 518 19589 10.22034/cmde.2025.58316.2465 EN Vishal Chandel Department of Mathematics & Scientific Computing, National Institute of Technology Hamirpur, Hamirpur, 177005, Himachal Pradesh, India. Sunil - Department of Mathematics & Scientific Computing, National Institute of Technology Hamirpur, Hamirpur, 177005, Himachal Pradesh, India. Poonam Sharma Department of Mathematics, Govt. College Jawalaji, Jawalamukhi, Kangra, 176031, Himachal Pradesh, India. Journal Article 2023 09 06 A mathematical and computational study of the impact of rotation on the thermal convection of partially-ionized plasma has been explored using both linear and nonlinear analyses. The method of normal mode analysis has been used to study the linear analysis whereas, for nonlinear analysis, we have used the generalized energy method. For numerical analysis, we have employed the Galerkin method. It has been found that the Rayleigh number for nonlinear analysis is the same as station ary convection. Hence, we concluded that there is no sub-critical region and the system is globally stable. The effect of collision plays an important role in the energy decay analysis. It has also been observed that for stationary convection, the collisional frequency has no impact on stability, whereas rotation stabilizes the system. The effect of various parameters has also been discussed for oscillatory convection. The stability characteristics for different bounding surfaces are examined. For low rotation rates, partially ionized plasma confined between rigid–rigid boundaries is the most stable configuration; however, at high rotation rates, the free–free bounding surfaces yield the greatest stability. https://cmde.tabrizu.ac.ir/article_19589_8af2ab5bc39e7052ff28497bcb79986a.pdf