Strong Stein neighborhood bases

Abstract

Let D be a smooth bounded pseudoconvex domain in Cn. We give several characterizations for the closure of D to have a strong Stein neighborhood basis in the sense that D has a defining function r such that z∈ Cn:r(z)<a is pseudoconvex for sufficiently small a>0. We also show that this condition is invariant under proper holomorphic maps that extend smoothly to the boundary.