On stabilization of solutions of higher order evolution inequalities
Abstract
We obtain sharp conditions guaranteeing that every non-negative weak solution of the inequality Σ|α| = m ∂α aα (x, t, u) - ut f (x, t) g (u) in R+n+1 = Rn × (0, ∞), m,n 1, stabilizes to zero as t ∞. These conditions generalize the well-known Keller-Osserman condition on the grows of the function g at infinity.
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