Certain real surfaces in C2 with isolated singularities

Abstract

Under certain geometric condition, the surfaces in C2 with isolated CR singularity at the origin and with cubic lowest degree homogeneous term in its graph near the origin, can be reduced, up to biholomorphism of C2, to a one parameter family of the form \[ Mt:=\(z,w)∈C2: w=z2z+tzz2+t23 z3+o(|z|3)\,\;\; t∈ (0,∞) \] near the origin. We prove that Mt is not locally polynomially convex if t<1. The local hull contains a ball centred at the origin if t<3/2. We also prove that Mt is locally polynomially convex for t≥32. We show that, for 3/2≤ t<1, the polynomial hull of Mt B(0;δ) contains a one parameter family of analytic discs passing through the origin for every δ>0. We also prove that, if we remove the higher order terms from the graphing function of Mt, it is locally polynomially convex for t≥15-3322. Some new results about the local polynomial convexity of the union of three totally-real planes are also reported.