Decay Rate of $$\varvec{\exp (A^{-1}t)A^{-1}}$$ on a Hilbert Space and the Crank–Nicolson Scheme with Smooth Initial Data

Pub Date : 2023-11-12 DOI:10.1007/s00020-023-02748-1

Masashi Wakaiki

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Abstract

Abstract This paper is concerned with the decay rate of $$e^{A^{-1}t}A^{-1}$$ e A - 1 t A - 1 for the generator A of an exponentially stable $$C_0$$ C 0 -semigroup on a Hilbert space. To estimate the decay rate of $$e^{A^{-1}t}A^{-1}$$ e A - 1 t A - 1 , we apply a bounded functional calculus. Using this estimate and Lyapunov equations, we also study the quantified asymptotic behavior of the Crank-Nicolson scheme with smooth initial data. A similar argument is applied to a polynomially stable $$C_0$$ C 0 -semigroup whose generator is normal.

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Hilbert空间上$$\varvec{\exp (A^{-1}t)A^{-1}}$$的衰减率及初始数据光滑的Crank-Nicolson格式

研究Hilbert空间上指数稳定的$$C_0$$ c0 -半群的生成子A的衰减率($$e^{A^{-1}t}A^{-1}$$ e A - 1)和(A - 1)。为了估计$$e^{A^{-1}t}A^{-1}$$ e A - 1 t A - 1的衰减率，我们应用了有界泛函演算。利用这个估计和Lyapunov方程，我们还研究了具有光滑初始数据的Crank-Nicolson格式的量化渐近行为。一个类似的论证被应用于多项式稳定的$$C_0$$ C 0 -半群，它的生成器是正常的。

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