Completeness theorems on the boundary for a parabolic equation
Abstract
Let \vα\ be a system of polynomial solutions of the parabolic equation ahk∂xhxku - ∂t u =0 in a bounded C1-cylinder T contained in Rn+1. Here ahk∂xhxk is an elliptic operator with real constant coefficients. We prove that \vα\ is complete in Lp('), where ' is the parabolic boundary of T. Similar results are proved for the adjoint equation ahk∂xhxk u+ ∂t u =0.
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