On stabilization of solutions of nonlinear parabolic equations with a gradient term

Abstract

For parabolic equations of the form ∂ u∂ t - Σi,j=1n aij (x, u) ∂2 u∂ xi ∂ xj + f (x, u, D u) = 0 in R+n+1, where R+n+1 = Rn × (0, ∞), n 1, D = (∂ / ∂ x1, …, ∂ / ∂ xn) is the gradient operator, and f is some function, we obtain conditions guaranteeing that every solution tends to zero as t ∞.