Optimal Gevrey Regularity for Certain Sums of Squares in Two Variables
Abstract
For q , a integers such that a ≥ 1 , 1 < q , (x, y) ∈ U , U a neighborhood of the origin in R2 , we consider the operator Dx2 + x2(q-1) Dy2 + y2a Dy2 . Slightly modifying the method of proof of monom we can see that it is Gevrey s0 hypoelliptic, where s0-1 = 1 - a-1 (q - 1) q-1 . Here we show that this value is optimal, i.e. that there are solutions to P u = f with f more regular than Gs0 that are not better than Gevrey s0 . The above operator reduces to the M\'etivier operator (metivier81) when a = 1 , q = 2 . We give a description of the characteristic manifold of the operator and of its relation with the Treves conjecture on the real analytic regularity for sums of squares.
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