Local and global estimates of solutions of Hamilton-Jacobi parabolic equation with absorption

Abstract

We obtain new a priori estimates for the nonnegative solutions of the equation \[ ut- u+|∇ u|q=0 \] in Q,T=×( 0,T) , T≤q∞, where q>0, and =RN, or is a smooth bounded domain of RN and u=0 on ∂×( 0,T) . In case =RN, we show that any solution u∈ C2,1(QRN,T) of equation (1.1) in QRN ,T (in particular any weak solution if q≤q2), without condition as x →∞, satisfies the universal estimate \[ ∇ u(.,t) q≤q1q-1u(.,t)% t, QRN,T. \] Moreover we prove that the growth of u is limited by C(t+t-1/(q-1% )(1+ x q), where C depends on u. We also give existence properties of solutions in Q,T, for initial data locally integrable or even unbounded Radon measures. We give a nonuniqueness result in case q>2. Finally we show that besides the local regularizing effect of the heat equation, u satisfies a second effect of type LlocR% -Lloc∞, due to the gradient term.