A codimension two CR singular submanifold that is formally equivalent to a symmetric quadric

Abstract

Let M⊂ Cn+1 (n≥ 2) be a real analytic submanifold defined by an equation of the form: w=|z|2+O(|z|3), where we use (z,w)∈ Cn× C for the coordinates of Cn+1. We first derive a pseudo-normal form for M near 0. We then use it to prove that (M,0) is holomorphically equivalent to the quadric (M∞: w=|z|2,0) if and only if it can be formally transformed to (M∞,0). We also use it to give a necessary and sufficient condition when (M,0) can be formally flattened. The result is due to Moser for the case of n=1.