Explicit calculation of Siu's Effective Termination in Kohn's Algorithm for Special Domains in C3

Abstract

In this article, we follow the arguments in a paper of Y-T. Siu to study the effective termination of Kohn's algorithm for special domains in C3. We make explicit the effective constants and generic conditions that appear there, and we obtain an explicit expression for the regularity of the Dolbeault laplacian for the ∂-Neumann problem. Specifically, on a local peudoconvex domain of the special shape \[ := \(z1,z2,z3)∈C3:\ 2Re\ z3+ Σi=1N|Fi(z1,z2)|2<0 \ \] with holomorphic function germs F1,…,FN∈OC2,0 of finite intersection multiplicity \[ s:=C\ OC2,0 / F1,…, FN < ∞, \] we show that an -subelliptic regularity for (0,1)-forms holds whenever, just in terms of s, \[ ≥slant 1 2(4s2-1)s+3 s2(4s2-1)4 8s+18s-1. \]