Article
MSC:
45D05,
45N05,
49J22,
65R20,
74D05 | MR 2025957 | Zbl 1099.45001 | DOI: 10.1023/B:APOM.0000024487.48855.d9
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Keywords:
Volterra integral equation in a Hilbert space; Rothe’s method; maximization problem; viscoelastic body
Volterra integral equation in a Hilbert space; Rothe’s method; maximization problem; viscoelastic body
Summary:
We consider a class of Volterra-type integral equations in a Hilbert space. The operators of the equation considered appear as time-dependent functions with values in the space of linear continuous operators mapping the Hilbert space into its dual. We are looking for maximal values of cost functionals with respect to the admissible set of operators. The existence of a solution in the continuous and the discretized form is verified. The convergence analysis is performed. The results are applied to a quasistationary problem for an anisotropic viscoelastic body made of a long memory material.
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