Gain/Loss of derivatives for complex vector fields

Abstract

In z×t we consider the function g=g(z), set g1=z g, g1 1=zzg and define the operator Lg=z+ig1t. We discuss estimates with loss of derivatives, in the sense of Kohn, for the system ( Lg,fkLg) where ( Lg,Lg) is 12m subelliptic at 0 and f(0)=0,\,\,df(0)≠0. We prove estimates with a loss l=k-12m if the "multiplier" condition |f| |g1 1|12(m-1) is fulfilled. (For estimates without cut-off, subellipticity can be weakened to compactness and this results in a loss of l= [2(m-1).) For the choice (g,fk)=(|z|2m, zk) this result was obtained by Kohn and Bove-Derridj-Kohn-Tartakoff for m=1 and m≥1 respectively. Also, the loss l=k-12m was proven to be optimal. We show that it remains optimal for the model (g,fk)=(x2m,xk). Instead, for the model (g,fk)=(|z|2m,xk), in which the multiplier condition is violated, the loss is not lowered by the type and must be ≥ k-12.