In this paper we determine a (possibly) non-continuous scalar relaxation kernel of bounded variation in an integrodifferential equation related to a Banach space when a nonlocal additional measurement involving the state function is available. We prove a result concerning global existence and uniqueness. An application is given, in the framework of space of continuous functions, to the case of one-dimensional hyperbolic second-order integrodifferential equations endowed with initial and Dirichlet boundary conditions.
Regularity and identification for an integrodifferential one-dimensional hyperbolic equation / A. Lorenzi, E. Sinestrari. - In: INVERSE PROBLEMS AND IMAGING. - ISSN 1930-8337. - 3:3(2009), pp. 505-536. [10.3934/ipi.2009.3.505]
Regularity and identification for an integrodifferential one-dimensional hyperbolic equation
A. LorenziPrimo
;
2009
Abstract
In this paper we determine a (possibly) non-continuous scalar relaxation kernel of bounded variation in an integrodifferential equation related to a Banach space when a nonlocal additional measurement involving the state function is available. We prove a result concerning global existence and uniqueness. An application is given, in the framework of space of continuous functions, to the case of one-dimensional hyperbolic second-order integrodifferential equations endowed with initial and Dirichlet boundary conditions.
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