On Normal Forms of Singular Levi-Flat Real Analytic Hypersurfaces

Abstract

Let F(z)=Re(P(z)) + h.o.t be such that M=(F=0) defines a germ of real analytic Levi-flat at 0∈Cn, n≥2, where P(z) is a homogeneous polynomial of degree k with an isolated singularity at 0∈Cn and Milnor number μ. We prove that there exists a holomorphic change of coordinate φ such that φ(M)=(Re(h)=0) where h(z) is a polynomial of degree μ+1 and jk0(h)=P.