Characterizations of the Crandall--Pazy Class of C0-semigroups on Hilbert Spaces and Their Application to Decay Estimates
Abstract
We investigate immediately differentiable C0-semigroups (e-tA)t ≥ 0 satisfying 0 < t <1 t1/β\|Ae-tA\| < ∞ for some 0 < β ≤ 1. Such C0-semigroups are referred to as the Crandall--Pazy class of C0-semigroups. In the Hilbert space setting, we present two characterizations of the Crandall--Pazy class. We then apply these characterizations to estimate decay rates for Crank--Nicolson schemes with smooth initial data when the associated abstract Cauchy problem is governed by an exponentially stable C0-semigroup in the Crandall--Pazy class. The first approach is based on a functional calculus called the B-calculus. The second approach builds upon estimates derived from Lyapunov equations and improves the decay estimate obtained in the first approach, under the additional assumption that -A-1 generates a bounded C0-semigroup.
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