Geometric Analysis on the Diederich-Fornss Index

Abstract

We derive a sufficient condition on a bounded pseudoconvex domain ⊂C2 with smooth boundary such that -(-)η is plurisubharmonic on for η>0 arbitrarily close to 1 (the supremum of η is called Diederich-Fornss index, see Definition (df)). This condition (see Theorem prop) extends a theorem of Fornss and Herbig in 2007 and only requires restriction on Levi-flat sets of the boundary ∂. Since the condition is on Levi-flat sets, it contains more geometric information. As an application of this new condition, we discuss how the geometry of the Levi-flat sets affects the Diederich-Fornss index. Among other results, we show that the Diederich-Fornss index is 1 if only the Levi-flat sets form a real curve transversal to the holomorphic tangent vector fields on ∂ (see Theorem [main]). We also give a specific example (see Theorem [example]) on the bounded pseudoconvex domains which verify the application but are neither of finite type nor admit a plurisubharmonic defining function on the boundary.