Abstract
In a Banach space, we consider a Cauchy type problem with a left Hadamard fractional derivative of order α ∈ (0, 1) and a Cauchy problem with a regularized Hadamard fractional derivative. We prove the well-posed solvability of such problems with a bounded operator as well as with the generator of a strongly continuous semigroup. For inverse coefficient problems, we indicate sufficient conditions for their unique solvability.
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