On local Gevrey regularity for Gevrey vectors of subelliptic sums of squares -- an elementary proof of a sharp Gevrey Kotake-Narasimhan theorem

Abstract

We study the regularity of Gevrey vectors for H\"ormander operators P = Σj=1m Xj2 + X0 + c where the Xj are real vector fields and c(x) is a smooth function, all in Gevrey class Gs. The principal hypothesis is that P satisfies the subelliptic estimate: for some >0, \; ∃ \,C such that \|v\|2 ≤ C(|(Pv, v)| + \|v\|02) ∀ v∈ C0∞. We prove directly (without the now familiar use of adding a variable t and proving suitable hypoellipticity for Q=-Dt2-P and then, using the hypothesis on the iterates of P on u, constructiong a homogeneous solution U for Q whose trace on t=0 is just u) that for s≥ 1,\,Gs(P,0) ⊂ Gs/(0); that is, ∀ K 0, \;∃ CK: \|Pj u\|L2(K)≤ CKj+1 (2j)!s, \;∀ j ∀ K' 0, \;∃ CK':\,\|D u\|L2(K') ≤ CK'+1 !s/ε, \;∀ . In other words, Gevrey growth of derivatives of u as measured by iterates of P yields Gevrey regularity for u in a larger Gevrey class. When ε =1, P is elliptic and so we recover the original Kotake-Narasimhan theorem (KN1962), which has been studied in many other classes, including ultradistributions (BJ).