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Convergence Rates of Regularized Approximation Processes

✍ Scribed by Sen-Yen Shaw; Hsiang Liu

Publisher
Elsevier Science
Year
2002
Tongue
English
Weight
185 KB
Volume
115
Category
Article
ISSN
0021-9045

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✦ Synopsis

We define the concept of an A-regularized approximation process and prove for it uniform convergence theorems and strong convergence theorems with optimal and non-optimal rates. The sharpness of non-optimal convergence is also established. The general results provide a unified approach to dealing with convergence rates of various approximation processes, and also of local ergodic limits as well. As applications, approximation theorems, and local Abelian and CesΓ‘ro ergodic theorems with rates are deduced for n-times integrated solution families for Volterra integral equations, which include n-times integrated semigroups and cosine functions as special cases. Applications to (Y)-semigroups and tensor product semigroups are also discussed.

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