CR Singularities and Generalizations of Moser's Theorem II

Abstract

Let a real-analytic manifold M formally (holomorphically) equivalent to the following model equation*w=z1z1+…+zNzN+λ1(z12+z12)+…+λN(zN2+zN2),equation* assuming that λ1,…, λN∈ [0,12). It is proven that M is holomorphically equivalent to this model by developing a partial normal form for such real-analytic submanifold using generalized Fischer Decompositions. In particular, there are defined certain Spaces of Normalizations used also in proving other analogues of The Theorem of Moser in certain non-equidimensional situations. There presented also other applications for the methods considered.