Weak Solution for 3D-Stochastic Third Grade Fluid Equations

Abstract: This article studies the stochastic evolution of incompressible non-Newtonian fluids of differential type. More precisely, we consider the equations governing the dynamic of a third grade fluid filling a three-dimensional bounded domain O, perturbed by a multiplicative white noise. Taking the initial condition in the Sobolev space H2(O), and supplementing the equations with a Navier slip boundary condition, we establish the existence of a global weak stochastic solution with sample paths in L∞(0,T;H2(O)).

Optimal control of two dimensional third grade fluids

Optimal control of two dimensional third grade fluids

A Three-Dimensional Velocity Field Related to a Generalized Third-Grade Fluid Model