Zero sets of Lie algebras of analytic vector fields on real and complex 2-dimensional manifolds, II

Abstract

On a real ( F= R) or complex ( F= C) analytic connected 2-manifold M with empty boundary consider two vector fields X,Y. We say that Y tracks X if [Y,X]=fX for some continuous function f M→ F. Let K be a compact subset of the zero set Z(X) such that Z(X)-K is closed, with nonzero Poincar\'e-Hopf index (for example K= Z(X) when M is compact and (M)≠ 0) and let G be a finite-dimensional Lie algebra of analytic vector fields on M. Theorem. Let X be analytic and nontrivial. If every element of G tracks X and, in the complex case when iK (X) is positive and even no quotient of G is isomorphic to s l (2, C), then G has some zero in K. Corollary. If Y tracks a nontrivial vector field X, both of them analytic, then Y vanishes somewhere in K. Besides fixed point theorems for certain types of transformation groups are proved. Several illustrative examples are given.