Mathematics – Spectral Theory
Scientific paper
2012-03-30
Recent Advances in Applied Mathematics Proceedings of the 14th International Conference on Applied Mathematics, Puerto de la C
Mathematics
Spectral Theory
Scientific paper
In this paper we develop hydrodynamic models using spectral differential operators to investigate the spatial stability of swirling fluid systems. Including viscosity as a valid parameter of the fluid, the hydrodynamic model is derived using a nodal Lagrangian basis and the polynomial eigenvalue problem describing the viscous spatial stability is reduced to a generalized eigenvalue problem using the companion vector method. For inviscid study the hydrodynamic model is obtained by means of a class of shifted orthogonal expansion functions and the spectral differentiation matrix is derived to approximate the discrete derivatives. The models were applied to a Q-vortex structure, both schemes providing good results.
Bistrian Diana Alina
Dragomirescu Florica Ioana
Savii George
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