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  • For any and any , , that is, , , one has There exists such that for any , Then, there exists a and a unique function , which for every is holomorphic in with values in and is a solution to the Cauchy problem (51).Next, we restate the Cauchy problem (1) in a more convenient form, and we can rewrite the Cauchy problem (1) as follows: Applying the operator to both sides of the first equation and seco
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