On the uniqueness of solutions of two inverse problems for the subdiffusion equation

Abstract

Let A be an arbitrary positive selfadjoint operator, defined in a separable Hilbert space H. The inverse problems of determining the right-hand side of the equation and the function φ in the non-local boundary value problem Dt u(t) + Au(t) = f(t) (0 < < 1, 0 < t ≤ T), u() = α u(0) + φ, (α is a constant and 0 < ≤ T), is considered. Operator Dt on the left-hand side of the equation expresses the Caputo derivative. For both inverse problems u(1) = V is taken as the over-determination condition. Existence and uniqueness theorems for solutions of the problems under consideration are proved. The influence of the constant α on the existence and uniqueness of a solution to problems is investigated. An interesting effect was discovered: when solving the forward problem, the uniqueness of the solution u(t) was violated, while when solving the inverse problem for the same values of α, the solution u(t) became unique.

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