The Strong Diederich-Fornss Index on C2 Domains in Hermitian Manifolds
Abstract
For a relatively compact Stein domain with C2 boundary in a Hermitian manifold M, we consider the strong Diederich-Fornss index, denoted DF(): the supremum of all exponents 0<η<1 such that eigenvalues of the complex Hessian of -(-)η are bounded below by some positive multiple of (-)η on for some C2 defining function . We will show that DF() is completely characterized by the existence of a Hermitian metric with curvature terms satisfying a certain inequality when restricted to the null-space of the Levi-form.
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