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ABSTRACT In this paper, we investigate the existence and uniqueness of solutions belonging to the vector-valued space by using Blunck's theorem on the equivalence between operator-valued -multipliers and the notion… Click to show full abstract
ABSTRACT In this paper, we investigate the existence and uniqueness of solutions belonging to the vector-valued space by using Blunck's theorem on the equivalence between operator-valued -multipliers and the notion of R-boundedness for the discrete time Volterra equation with delay given by where A is a closed linear operator with domain defined on a Banach space X, and verifies suitable conditions such as 1-regularity. We characterize maximal -regularity of solutions of such problems in terms of the data and an spectral condition, and we provide optimal estimates. Moreover, we illustrate our results providing different models that label into our general scheme such as the discrete time wave and Kuznetsov equations.
Journal Title: Journal of Difference Equations and Applications
Year Published: 2019
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