The eternal solutions of parabolic equations with boundary condition

Abstract

In this paper, we study the parabolic equations of the form \ arrayrcll Lu(y,t) &=& f, &(y,t)∈ Q,\\ u(y,t)&=& 0, &(y,t)∈ ∂ Q, \\ u(y,t)&& -8mmis uniformly bounded from below, &(y,t)∈ Q, array . where Q=×R⊂Rn+1 and ⊂Rn is a bounded Lipschitz domain with 0∈. Here L is a general second order uniformly parabolic differential operator in non-divergence form or divergence form. For f=0, we establish the structure of the solution space, which is one dimensional and the solutions in this space grow exponentially at one end and decay exponentially at the other. For f≠0, we show that all solutions can be presented by the solutions corresponding to the homogenous equations(f=0) and a bounded special solution of the inhomogeneous equations. Our method is based on maximum principle in Q and the Harnack type inequalities.

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