This note is concerned with the initial value problem for the abstract nonlocal equation (Au)' + (Bu) There Exists f where A is a maximal monotone operator from a reflexive Banach space E to its dual E*, while B is a nonlocal maximal monotone operator from L-p (0, T; E) to L-q (0, T; E*) with p(-1) + q(-1) = 1, p is an element of (1, infinity). Under proper boundedness and coercivity assumptions on the operators, a solution is achieved by means of a discretization argument. Uniqueness and continuous dependence are also discussed and we prove some estimates for the discretization error. Finally, we deal with the approximation of linear Volterra integrodifferential operators.
On some nonlocal evolution equations in Banach spaces
Stefanelli U
2004
Abstract
This note is concerned with the initial value problem for the abstract nonlocal equation (Au)' + (Bu) There Exists f where A is a maximal monotone operator from a reflexive Banach space E to its dual E*, while B is a nonlocal maximal monotone operator from L-p (0, T; E) to L-q (0, T; E*) with p(-1) + q(-1) = 1, p is an element of (1, infinity). Under proper boundedness and coercivity assumptions on the operators, a solution is achieved by means of a discretization argument. Uniqueness and continuous dependence are also discussed and we prove some estimates for the discretization error. Finally, we deal with the approximation of linear Volterra integrodifferential operators.| File | Dimensione | Formato | |
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