On the Microlocal Regularity of the Gevrey Vectors for second order partial differential operators with non negative characteristic form of first kind

Abstract

We study the microlocal regularity of the analytic/Gevrey vectors for the following class of second order partial differential equations align* P(x,D) = Σ,j=1n a,j(x) D Dj + Σ=1n i b(x) D +c(x), align* where a,j(x) = aj,(x), b(x), ,j ∈ 1,…,\, n, are real valued real Gevrey functions of order s and c(x) is a Gevrey function of order s, s ≥ 1, on open neighborhood of the origin in Rn. Thus providing a microlocal version of a result due to M. Derridj in "Gevrey regularity of Gevrey vectors of second order partial differential operators with non negative characteristic form", Complex Anal. Synerg. 6, 10 (2020), https://doi.org/10.1007/s40627-020-00047-8.