On Competing Definitions for the Diederich-Fornss Index

Abstract

Let ⊂Cn be a bounded pseudoconvex domain. We define the Diederich-Fornss index with respect to a family of functions to be the supremum over the set of all exponents 0<η<1 such that there exists a function η in this family such that -η is comparable to the distance to the boundary of on and such that -(-η)η is plurisubharmonic on . We first prove that computing the Diederich-Fornss index with respect to the family of upper semi-continuous functions is the same as computing the Diederich-Fornss index with respect to the family of Lipschitz functions. When the boundary of is Ck, k≥ 2, we prove that the Diederich-Fornss index with respect to the family of Ck functions is the same as the Diederich-Fornss index with respect to the family of C2 functions.