LINEARIZATION OF TENSOR NONLINEAR CONSTITUTIVE RELATIONS IN THE PROBLEMS ON STABILITY OF FLOWS

The apparatus of tensor nonlinear functions occupies an important place in the nonlinear mechanics of a continuous medium, both in  hydrodynamic applications and in problems of mechanics of a  deformed solid, strength and fracture [1]. Tensor nonlinear defining  correlations simulate the socalled orthogonal effects of the stress- strain state (see in [2] a review on the issue), characterized by  noncollinearity of voltage deviators and the corresponding kinematic  tensor. Such a noncollinearity can explain the Poynting effect and  ratchet [3–9]. The scientific works pays much attention both to the  definition of the main flow parameters and to the stability of such a  flow with respect to small perturbations belonging to a particular class. The statement of the boundary value problem in  perturbations assumes the linearization of all the system equations  near the main process, including the defining correlations. Along with the general form of the tensor-nonlinear determining relations,  the paper considers tensor-linear isotropic media, tensor linear  potential media, the Bingham body (a twoconstant viscoplastic  model), the Saint-Venant flow (ideally rigid-plastic model), and the Newtonian fluid.

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