Local Solvability For a Class of Partial Differential Operators With Double Characteristics

Abstract

A necessary and sufficient condition for local solvability is presented for the linear partial differential operators -X2-Y2+ia(x)[X,Y] in R3=\(x,y,t)\, where X=∂x,\; Y=∂y+xk∂t, and a∈ C∞( R1) is real valued, for each positive integer k.

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