On the directional growth of the resolvent norm

Abstract

Let A be a closed densely defined operator on a separable Hilbert space H. Assume the resolvent set (A) is non-empty. For z,z'∈(A) let [z,z'] denote the straight line segment from z to z'. For each z∈(A) we classify the behavior of the resolvent norm ζ RA(ζ) near z. Either there are z'∈(A), z'≠ z, [z,z']⊂(A), such that RA(ζ) ≥ RA(z) + C ζ-z δ for ζ∈[z,z'] with δ=1 or δ=2, or the function ζ RA(ζ) has a global minimum at ζ=z.