Hypoellipticity and vanishing theorems

Abstract

Let - (essentially Lie derivative with respect to , a smooth nowhere zero real vector field) and P be commuting differential operators, respectively of orders 1 and m≥ 1, the latter formally normal, both acting on sections of a vector bundle over a closed manifold. It is shown that if P+(-i)m is elliptic then the restriction of - to ⊂ P⊂ L2 yields a selfadjoint operator -|:⊂ P P with compact resolvent ( is specified carefully). It is also shown that, in the presence of an additional hypothesis on microlocal hypoellipticity of P, -| is semi-bounded. These results are applied to CR manifolds on which acts as an infinitesimal CR transformation which are then shown to yield versions of Kodaira's vanishing theorem.