Global existence of solutions of the stochastic incompressible non-Newtonian fluid models

Abstract

In this paper, we study the existence of solutions of stochastic incompressible non-Newtonian fluid models in R. For the existence of solutions, we assume that the extra stress tensor S is represented by S( A) = F ( A) A for n × n matrix G. We assume that F(0) is uniformly elliptic matrix and align* | F( G)|, \,\, | D F ( G)|, \,\, | D2( F ( G) ) G| ≤ c for all 0 < | G| ≤ r0 align* for some r0 > 0. Note that F1 and F2 for d ∈ R, and F3 for d ≥ 3 introduced in (1.2) satisfy our assumption.

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